Works which cite articles authored by Daniel Girela

D. Girela. Integral means and BMOA-norms of logarithms of univalent functions. J. London Math. Soc. (2)  33 (1986), no. 1, 117--132.

Cited in:

1. D. Girela. BMO, $A\sb 2$-weights and univalent functions. Analysis 7 (1987), 2, 129-143.

2. M. M. Elhosh. On a subclass of Bazilevic functions. Bull. Australian Math. Soc. 39 (1989), 167-170.

3. S. Yamashita. Gel’fer functions, integral means, bounded mean oscillation, and univalency. Trans. Amer. Math. Soc. 321 (1990), no. 1, 245-259.

4. S. Yamashita. A norm for a mean Lipschitz space of holomorphic functions in the disk. Math. Japon. 35 (1990), no. 5, 935--947.

5. D. Girela. Integral Means, Bounded Mean Oscillation, and Gelfer Functions. Proc. Amer. Math. Soc. Vol. 113, No. 2 (Oct., 1991), pp. 365-370.

6. M. Nowak. Some Inequalities for BMOA functions. Complex Variables Theory Appl. 16 (1991), no. 2-3, 81-86.

7. Yang Gwowei. Logarithmic integral means of mean univalent functions. Yantai Teach. Univ. J. Nat. Sci. Ed. 8 (1992), 1, 19-21.

8. D. Girela. Inequalities for the integral means of BMOA functions. Complex Variables Theory Appl. 25 (1994), no. 1, 43-48.

9. N. Danikas. On the exact norm value of some BMOA functions. Results Math. 25 (1994), no. 3-4, 224--233.

10. Dong, Xinhan.Integral means of derivatives of close-to-convex function of $k$-fold symmetry. Acta Sci. Nat. Univ. Norm. Hunanensis 19, No.1, 8-12 (1996).

11. M. M. Elhosh. On the logarithmic coefficients of close-to-convex functions. J. Austral. Math. Soc. Ser. A 60 (1996), no. 1, 1--6.

12. D. Girela. Analytic functions of bounded mean oscillation. Complex function spaces (Mekrijärvi, 1999), 61--170, Univ. Joensuu Dept. Math. Rep. Ser., 4, Univ. Joensuu, Joensuu, 2001.

13. J.J. Donaire, D. Girela and D. Vukotic. On univalent functions in some Möbius invariant spaces. J. Reine Angew. Math. 553 (2002), 43-72.

14. Y. Guowei, W. Xianmei and T. Xuyan. Some sharp inequalities for quasi-subrodinate functions and mean-univalent functions. Advances in Modelling and Analysis A 41 (2004), n. 1-2, 51-60.

15. J. Xiao. Geometric $Q\sb p$ functions. Frontiers in Mathematics. Birkhäuser Verlag, Basel, 2006.

16. F. Colonna. Weighted composition operators between $H^\infty _\mu $ and $BMOA$, Bull. Korean Math. Soc.  50 (2013), n. 1, 185-200.

17. F. Colonna and M. Tjani. Weighted composition operators from the Besov space into the weighted-type space $H^\infty_\mu $. J. Math. Anal. Appl. 402 (2013), n. 2, 594-611.

D. Girela. BMO, $A\sb 2$-weights and univalent functions. Analysis 7 (1987), 2, 129-143.

Cited in:

1. S. Yamashita. Gel’fer functions, integral means, bounded mean oscillation, and univalency. Trans. Amer. Math. Soc. 321 (1990), no. 1, 245-259.

2. J.J. Donaire, D. Girela and D. Vukotic. On univalent functions in some Möbius invariant spaces. J. Reine Angew. Math. 553 (2002), 43-72.

3. D. Girela. Analytic functions of bounded mean oscillation. Complex function spaces (Mekrijärvi, 1999), 61--170, Univ. Joensuu Dept. Math. Rep. Ser., 4, Univ. Joensuu, Joensuu, 2001.

4. J. Xiao. Geometric $Q\sb p$ functions. Frontiers in Mathematics. Birkhäuser Verlag, Basel, 2006.

5. C. González and J. A. Peláez. Univalent functions in Hardy spaces in terms of the growth of arc-length. Journal of Geometric Analysis 19 (2009), n. 4, 755-771.

D. Girela. Integral means and radial growth of Bloch functions. Math. Z. 195 (1987), no. 1, 37-50.

Cited in:

1. R. Bañuelos and Ch. N. Moore. Some results in analysis related to the law of the iterated logarithm. Analysis at Urbana, Vol. I (Urbana, IL, 1986--1987), 47-80, London Math. Soc. Lecture Note Ser., 137, Cambridge Univ. Press, Cambridge, 1989.

2. N. G. Makarov. Probability methods in the theory of conformal mappings. (Russian) Algebra i Analiz 1 (1989), no. 1, 3-59; translation in Leningrad Math. J. 1 (1990), no. 1, 1-56.

3. Fa Lun Huang. Integral means and radial growth of Bloch functions in the ball. Anhui University Journal: Nat. Sci. Ed. 14  (1990),  2, 1-10.

4. A. Bonilla and F. Pérez González. Radial growth and boundedness for Bloch functions. Bull. Australian Math. Soc. 42 (1990), 33-39.

5. D. Girela. On Bloch functions and gap series. Publicacions Matemàtiques 35 (1991), 403-427.

6. D. Girela. A note on the radial growth of Bloch functions. Bull. Australian Math. Soc. 45 (1992), 143-149.

7. Fa Lun Huang. A property of $H^p$ functions in the ball. Anhui University Journal: Nat. Sci. Ed. 21 (1997), 1, 1-4.

8. R. Bañuelos and Ch. N. Moore. Probabilistic behaviour of harmonic functions. Birkhauser-Verlag 1999.

9. D. Girela, M. Nowak and P. Waniurski. On the zeros of Bloch functions. Math. Proc. Cambridge Phil. Soc. 129 (2000), no. 1, 117-128.

10. J. Godula and V. V. Starkov. On some properties of means of Bloch functions. Geometric theory of functions, boundary value problems and their applications (Russian) (Kazan’, 2002), 351-359, Tr. Mat. Tsentra im. N. I. Lobachevskogo, 14, Kazan. Mat. Obs., Kazan’, 2002.

11. D. Girela. Some questions on Bloch functions. Technical Report n. 7, Department of Mathematics, Aristotle University of Thessaloniki (2003), 9 pp.

12. J. A. Peláez. Contribuciones a la teoría de ciertos espacios de funciones analíticas. Tesis Doctoral, Universidad de Málaga (2004).

13. J. Godula and V. V. Starkov. Remarks on the boundary behavior of Bloch functions. (Russian).  Izv. Vyssh. Uchebn. Zaved. Mat. 2005,  no. 4, 30-37.

14. I. R. Kayumov. Integral characteristics of conformal mappings (in russian). Doctoral Thesis. Kazan 2006.

D. Girela. Integral means of univalent functions with restricted Hayman index. Israel J. Math. 65 (1989), no. 1, 44-58.

Cited in:

1. D. Girela. Logarithmic coefficients of univalent functions. Ann. Acad. Sci. Fenn. Math. 25 (2000), no. 2, 337-350.

2. Z. Grinshpan. Logarithmic geometry, exponentiation, and coefficient bounds in the theory of univalent functions and nonoverlapping domains. Handbook of complex analysis: geometric function theory, Vol. 1, 273-332, North-Holland, Amsterdam, 2002.

3. Ning, Ju Hong and Ye, Zhong Qiu. Successive coefficients of circularly symmetric functions. (Chinese) J. Math. Study 38 (2005), no. 3, 286-291.

D. Girela. On analytic functions with finite Dirichlet integral. Complex Variables Theory Appl. 12 (1989), no. 1-4, 9-15.

Cited in:

1. D. Girela. On Bloch functions and gap series. Publicacions Matemàtiques 35 (1991), 403-427.

2. D. Girela. Radial growth and variation of  univalent functions and of Dirichlet finite holomorphic functions. Colloq. Math. 69 (1995), no. 1, 19-28.

3. C. González and M. A. Márquez. Growth of the derivative of $Q\sb p$-functions. (Spanish). Proceedings of the Meeting of Andalusian Mathematicians, Vol. II (Spanish) (Sevilla, 2000), 511-517, Colecc. Abierta, 52, Univ. Sevilla Secr. Publ., Seville, 2001.

4. C. González and M. A. Márquez. On the growth of the derivative of $Q\sb p$ functions. Ann. Univ. Mariae Curie-Sklodowska Sect. A  55 (2001), 23-38.

5. J. Xiao. Geometric $Q\sb p$ functions. Frontiers in Mathematics. Birkhäuser Verlag, Basel, 2006.

6. J. A. Meshes. A class of meromorphic functions of slow growth in the unit disk not containing any of their integrals. J. Math. Anal. Appl. 396, n. 2, (2012), 855-863.

D. Girela. Integral means, bounded mean oscillation, and Gel’fer functions. Proc. Amer. Math. Soc. 113 (1991), no. 2, 365-370.

Cited in:

1. Z. Grinshpan. Logarithmic geometry, exponentiation, and coefficient bounds in the theory of univalent functions and nonoverlapping domains. Handbook of complex analysis: geometric function theory, Vol. 1, 273-332, North-Holland, Amsterdam, 2002.

D. Girela. On Bloch functions and gap series. Publ. Mat. 35 (1991), n. 2, 403-427.

Cited in:

1. V. V. Starkov. Integral means of derivatives of locally univalent Bloch functions. Ann. Univ. Mariae Curie-Sklodowska Sect. A  53 (1999), 217-237.

2. M. A. Márquez. Espacios de funciones analíticas caracterizados por propiedades de las derivadas de sus elementos. Tesis Doctoral, Universidad de Málaga (2000).

3. V. V. Starkov. Integral means of the derivatives of locally univalent Bloch functions. (Russian) Tr. Petrozavodsk. Gos. Univ. Ser. Mat. No. 7 (2000), 83-105.

4. C. González and M. A. Márquez. Growth of the derivative of $Q\sb p$-functions. (Spanish).  Proceedings of the Meeting of Andalusian Mathematicians, Vol. II (Spanish) (Sevilla, 2000), 511-517, Colecc. Abierta, 52, Univ. Sevilla Secr. Publ., Seville, 2001.

5. C. González and M. A. Márquez. On the growth of the derivative of $Q\sb p$ functions. Ann. Univ. Mariae Curie-Sklodowska Sect. A  55 (2001), 23-38.

6. J. Godula and V. V. Starkov. On some properties of means of Bloch functions. Geometric theory of functions, boundary value problems and their applications (Russian) (Kazan’, 2002), 351-359, Tr. Mat. Tsentra im. N. I. Lobachevskogo, 14, Kazan. Mat. Obs., Kazan’, 2002.

7. J. Godula and V. V. Starkov. Remarks on the boundary behavior of Bloch functions. (Russian) Izv. Vyssh. Uchebn. Zaved. Mat. 2005,  no. 4, 30-37.

8. A. V. Shiskin. On a relationship between polyanalytic functions and Bloch functions. (Russian) Tr. Petrozavodsk. Gos. Univ. Ser. Mat. No. 12 (2005), 36-50.

9. A. Shiskin. Some questions on the boundary behaviour of holomorphic functios. Ph. D. Thesis. University of Petrozavodsk 2006.

D. Girela. Mean growth of the derivative of certain classes of analytic functions. Math. Proc. Cambridge Philos. Soc. 112 (1992), no. 2, 335--342.

Cited in:

1. D. Girela. Growth of the derivative of bounded analytic functions. Complex Variables Theory Appl. 20 (1992), no. 1-4, 221-227.

2. D. Girela, M. Lorente and M. D. Sarrión. Embedding derivatives of weighted Hardy spaces into Lebesgue spaces. Math. Proc. Cambridge Philos. Soc. 116 (1994), no. 1, 151-166.

3. D. Girela and J. Peláez. Carleson measures for spaces of Dirichlet type. Integral Equations Operator Theory  55 (2006), no. 3, 415-427.

4. D. Girela. Analytic functions of bounded mean oscillation. Complex function spaces (Mekrijärvi, 1999), 61-170, Univ. Joensuu Dept. Math. Rep. Ser., 4, Univ. Joensuu, Joensuu, 2001.

5. K. Astala and P. Koskela. H^p-theory for quasiconformal mappings. Pure and Applied Math. Quarterly  7 (2011), n. 1, 19-50.

6. P. Galanopoulos, D. Girela and M. J. Martín. Besov spaces, multipliers, and univalent functions. Complex Analysis and Operator Theory 7 (2013), n. 4, 1081-116.

D. Girela. Nontangential limits for analytic functions of slow growth in a disc. J. London Math. Soc. (2) 46 (1992), no. 1, 140-148.

Cited in:

1. D. Girela and F. Bravo. Some results of Lindelöf type involving the segmental behaviour of holomorphic functions. Math. Proc. Cambridge Philos. Soc. 114 (1993), no. 1, 57-65.

2. K. Wlodarczyk. Angular limits and derivatives for holomorphic maps of infinite dimensional homogeneous domains. Atti della Accademina Nazionale dei Lincei. Classe di Scienze Fisiche Matematiche e Naturtali. Rendiconti Licei Matematica e Applicazioni. Serie 9, Vol. 5 (1994), n. 1, 43-53.

3. M. A. Márquez. Espacios de funciones analíticas caracterizados por propiedades de las derivadas de sus elementos. Tesis Doctoral, Universidad de Málaga (2000).

4. D. Girela. Some questions on Bloch functions. Technical Report n. 7, Department of Mathematics, Aristotle University of Thessaloniki (2003), 9 pp.

5. D. Girela. Non-tangential limits for Bloch functions. Computational Methods and Function Theory  8 (2008), No. 1, 277-284.

6. K. F. Barth and P. J. Rippon. Non-Tangential Limits of Slowly Growing Analytic Functions. Computational Methods and Function Theory  8 (2008), No. 1, 85-99.

D. Girela. Growth of the derivative of bounded analytic functions. Complex Variables Theory Appl. 20 (1992), no. 1-4, 221-227.

Cited in:

1. D. Girela, M. Lorente and M. D. Sarrión. Embedding derivatives of weighted Hardy spaces into Lebesgue spaces. Math. Proc. Cambridge Philos. Soc. 116 (1994), no. 1, 151-166.

2. D. Girela and J. M. Anderson. Inequalities of Littlewood-Paley type, multipliers and radial growth of the derivative of analytic functions. J. Reine Angew. Math. 465 (1995), 11-40.

3. D. Girela and M. M. Rodríguez. Sharp estimates on the radial growth of the derivative of bounded analytic functions. Complex Variables Theory Appl. 28 (1996), no. 3, 271-283.

4. D. Girela. Analytic functions of bounded mean oscillation. Complex function spaces (Mekrijärvi, 1999), 61-170, Univ. Joensuu Dept. Math. Rep. Ser., 4, Univ. Joensuu, Joensuu, 2001.

5. J. A. Peláez. Contribuciones a la teoría de ciertos espacios de funciones analíticas. Tesis Doctoral, Universidad de Málaga (2004).

6. A. Baernstein, D. Girela and J. A. Peláez. Univalent functions, Hardy spaces and spaces of Dirichlet type. Illinois J. Math. 48 (2004), no. 3, 837-859.

7. D. Girela and J. A. Peláez. Growth properties and sequences of zeros of analytic functions in spaces of Dirichlet type. J. Aust. Math. Soc. 80 (2006), no. 3, 397-418.

8. D. Girela and J. A. Peláez. Carleson measures, multipliers and integration operators for spaces of Dirichlet type. J. Funct. Anal. 241 (2006), no. 1, 334-358.

9. J. Heittokangas, R. Korhonen and J. Rättyä. Linear differential equations with solutions in the Dirichlet type subspace of the Hardy space. Nagoya Math. J. 187 (2007), 91-113.

10. F. Pérez González and J. Rättyä. Inner functions in the Möbius invariant Besov-type spaces. Proc. Edinburgh Math. Soc. 52 (2009), 751-770.

11. Ch. Chatzifountas. Multipliers and integration operators in spaces of analytic functions. Ph. D. Thesis. Universidad de Málaga (2013).

12. Ch. Chatzifountas, D. Girela and J. A. Peláez. Multipliers of Dirichlet subspaces of the Bloch spaces. To appear in Journal of Operator Theory.

F. Bravo and D. Girela. Some results of Lindelöf type involving the segmental behaviour of holomorphic functions. Math. Proc. Cambridge Philos. Soc. 114 (1993), no. 1, 57-65.

Cited in:

1. D. Girela. Non-tangential limits for Bloch functions. Computational Methods and Function Theory  8 (2008), No. 1, 277-284.

2. K. F. Barth and P. J. Rippon. Non-Tangential Limits of Slowly Growing Analytic Functions. Computational Methods and Function Theory  8 (2008), No. 1, 85-99.

D. Girela, M. Lorente and M. D. Sarrión. Embedding derivatives of weighted Hardy spaces into Lebesgue spaces. Math. Proc. Cambridge Philos. Soc. 116 (1994), no. 1, 151--166.

Cited in:

1. R. Trujillo. Aproximación simultánea en diferentes espacios de funciones. Tesis Doctoral. Universidad de La Laguna. (1996).

2. A. Bonilla, F. Pérez González, A. Stray and R. Trujillo González. Approximation in weighted Hardy spaces. J. d’ Analyse Mathématique 73 (1997), 65-89.

3. Kang, Hyeonbae; Koo, Hyungwoon. Two-weighted inequalities for the derivatives of holomorphic functions and Carleson measures on the unit ball. Nagoya Math. J. 158 (2000), 107-131.

4. Choe, Boo Rim; Koo, Hyungwoon; Yi, Heungsu. Carleson type conditions and weighted inequalities for harmonic functions. Osaka J. Math. 39 (2002), no. 4, 945-962.

D. Girela. Inequalities for the integral means of BMOA functions. Complex Variables Theory Appl. 25 (1994), no. 1, 43--48.

Cited in:

1. R. Bañuelos and E. Housworth. An isoperimetric-type inequality for integrals of Green's functions. Michigan Math. J. 42 (1995), no. 3, 603-611.

2. R. Bañuelos,  T. Carroll and E. Housworth. Inradius and integral means for Green's functions and conformal mappings. Proc. Amer. Math. Soc. 126 (1998), no. 2, 577-585.

3. D. Girela. Analytic functions of bounded mean oscillation. Complex function spaces (Mekrijärvi, 1999), 61-170, Univ. Joensuu Dept. Math. Rep. Ser., 4, Univ. Joensuu, Joensuu, 2001.

D. Girela. Radial growth and variation of univalent functions and of Dirichlet finite holomorphic functions. Colloq. Math. 69 (1995), no. 1, 19-28.

Cited in:

1. C. González and M. A. Márquez. On the growth of the derivative of $Q\sb p$ functions. Ann. Univ. Mariae Curie-Sklodowska Sect. A 55 (2001), 23--38.

2. J. A. Meshes. A class of meromorphic functions of slow growth in the unit disk not containing any of their integrals.  J. Math. Anal. Appl. 396, n. 2, (2012), 855-863.

J. M. Anderson and D. Girela. J. Reine Angew. Math. 465 (1995). 11-40.

Cited in:

1. K. Grosse Erdman. The blocking technique, weighted mean operators and Hardy's inequality. Lecture Notes in Mathematics, 1679. Springer-Verlag, Berlin, 1998.

2. S. Buckley, P. Koskela and D. Vukotic. Fractional integration, differentiation, and weighted Bergman spaces. Math. Proc. Cambridge Phil. Soc. 126 (1999),  369-385.

3. D. Girela. Analytic functions of bounded mean oscillation. Complex function spaces (Mekrijärvi, 1999), 61--170, Univ. Joensuu Dept. Math. Rep. Ser., 4, Univ. Joensuu, Joensuu, 2001.

4. M. Pavlovic. Intagrability of vector-valued lacunary series with applications to function spaces. Annali di Matematica Pura ed Applicatica  192 (2013), n. 5, 745-762.

D. Girela and M. M. Rodríguez. Sharp estimates on the radial growth of the derivative of bounded analytic functions. Complex Variables Theory Appl. 28 (1996), no. 3, 271--283.

Cited in:

1.  J. M. Anderson and D. Girela. J. Reine Angew. Math. 465 (1995), 11-40.

2. D. Girela. Analytic functions of bounded mean oscillation. Complex function spaces (Mekrijärvi, 1999), 61--170, Univ. Joensuu Dept. Math. Rep. Ser., 4, Univ. Joensuu, Joensuu, 2001.

3. D. Girela, J. A. Peláez, F. Pérez González and J. Rättyä. Carleson measures for the Bloch space. Integral Equations and Operator Theory 61 (2008), n. 4, 511-547.

4. P. Mozolyako. Strong convergence of approximation units. Ph. D. thesis. St. Petersburg State University (2009).

5. Ch. Chatzifountas. Multipliers and integration operators in spaces of analytic functions. Ph. D. Thesis. Universidad de Málaga (2013).

D. Girela. On a theorem of Privalov and normal functions. Proc. Amer. Math. Soc. 125 (1997), no. 2, 433-442.

Cited in:

1. D. Girela. Mean Lipschitz spaces and bounded mean oscillation. Illinois J. Math. 41 (1997), no. 2, 214-230.

2. O. Blasco, D. Girela and M. A. Márquez. Mean growth of the derivative of analytic functions, bounded mean oscillation, and normal functions. Indiana Univ. Math. J. 47 (1998), no. 3, 893-912.

3. D. Girela and M. A. Márquez. Mean Growth of $H^p$ functions. Publ. Mat. 42 (1998), 301-318.

4. M. A. Márquez. Espacios de funciones analíticas caracterizados por propiedades de las derivadas de sus elementos. Tesis Doctoral, Universidad de Málaga (2000).

5. D. Girela and C. González. Some results on mean Lipschitz spaces of analytic functions. Rocky Mountain J. Math. 30 (2000), no. 3, 901-922.

6. D. Girela and C. González. Mean growth of the derivative of infinite Blaschke products. Complex Variables Theory Appl. 45 (2001), no. 1, 1-10.

7. D. Girela. Analytic functions of bounded mean oscillation. Complex function spaces (Mekrijärvi, 1999), 61-170, Univ. Joensuu Dept. Math. Rep. Ser., 4, Univ. Joensuu, Joensuu, 2001.

8. D. Girela and C. González. Division by inner functions. Progress in analysis, Vol. I, II (Berlin, 2001), 215--220, World Sci. Publ., River Edge, NJ, (2003).

9. D. Girela and J. A. Peláez. On the derivative of infinite Blaschke products. Illinois J. Math. 48 (2004), no. 1, 121-130.

10. J. A. Peláez. Contribuciones a la teoría de ciertos espacios de funciones analíticas. Tesis Doctoral, Universidad de Málaga (2004).

11. D. Girela and M. A. Márquez. Analytic functions with $H\sp p$-derivative. Rocky Mountain J. Math. 35 (2005), no. 2, 517-530.

12. D. Girela, C. González and J. A. Peláez. Multiplication and division by inner functions in the space of Bloch functions. Proc. Amer. Math. Soc. 134 (2006), no. 5, 1309-1314.

13. D. Girela, C. González and J. A. Peláez. Toeplitz operators and division by inner functions. Proceedings of the First Advanced Course in Operator Theory and Complex Analysis, 85--103, Univ. Sevilla Secr. Publ., Seville, 2006.

14. D. Girela. A class of conformal mappings with applications to function spaces. Recent advances in operator-related function theory, 113-121, Contemp. Math.393, Amer. Math. Soc., Providence, RI, 2006.

15. D. Girela and D. Suárez. On Blaschke products, Bloch functions and normal functions. Rev. Mat. Complutense  24, 1 (2011), 49-57.

D. Girela. Mean Lipschitz spaces and bounded mean oscillation. Illinois J. Math. 41 (1997), no. 2, 214--230.

Cited in:

1. O. Blasco, D. Girela and M. A. Márquez. Mean growth of the derivative of analytic functions, bounded mean oscillation, and normal functions. Indiana Univ. Math. J. 47 (1998), no. 3, 893-912.

2. M. A. Márquez. Espacios de funciones analíticas caracterizados por propiedades de las derivadas de sus elementos. Tesis Doctoral, Universidad de Málaga (2000).

3. D. Girela and C. González. Some results on mean Lipschitz spaces of analytic functions. Rocky Mountain J. Math. 30 (2000), no. 3, 901-922.

4. D. Girela and C. González. Mean growth of the derivative of infinite Blaschke products. Complex Variables Theory Appl. 45 (2001), no. 1, 1-10.

5. D. Girela. Analytic functions of bounded mean oscillation. Complex function spaces (Mekrijärvi, 1999), 61-170, Univ. Joensuu Dept. Math. Rep. Ser., 4, Univ. Joensuu, Joensuu, 2001.

6. D. Girela and J. A. Peláez. On the derivative of infinite Blaschke products. Illinois J. Math. 48 (2004), no. 1, 121-130.

7. J. A. Peláez. Contribuciones a la teoría de ciertos espacios de funciones analíticas. Tesis Doctoral, Universidad de Málaga (2004).

8. D. Girela and M. A. Márquez. Analytic functions with $H\sp p$-derivative. Rocky Mountain J. Math. 35 (2005), no. 2, 517-530.

9. D. Girela. A class of conformal mappings with applications to function spaces. Recent advances in operator-related function theory, 113-121, Contemp. Math. 393, Amer. Math. Soc., Providence, RI, 2006.

10. O. Blasco, D. Girela and M. A. Márquez. Embedding of analytic function spaces with given mean growth of the derivative. Math. Nachr. 279 (2006), no. 16, 1773-1782.

11. E. G. Kwon. Quantities equivalent to the norm of a weighted Bergman space. J. Math. Anal. Appl. 338, no. 2 (2008), 758-770.

12. E. G. Kwon. On a secure weight related to a weighted Bergman space. Proceedings of the 16th International Conference on finite or infinite dimensional complex anlysis and applications. (2009). 154-158.

13. D. Girela and D. Suárez. On Blaschke products, Bloch functions and normal functions. Rev. Mat. Complutense  24, 1 (2011), 49-57.

O. Blasco, D. Girela and M. A. Márquez. Mean growth of the derivative of analytic functions, bounded mean oscillation, and normal functions. Indiana Univ. Math. J.  47 (1998), no. 3, 893-912.

Cited in:

1. M. A. Márquez. Espacios de funciones analíticas caracterizados por propiedades de las derivadas de sus elementos. Tesis Doctoral, Universidad de Málaga (2000).

2. D. Girela and C. González. Some results on mean Lipschitz spaces of analytic functions. Rocky Mountain J. Math. 30 (2000), no. 3, 901-922.

3. D. Girela and C. González. Mean growth of the derivative of infinite Blaschke products. Complex Variables Theory Appl. 45 (2001), no. 1, 1-10.

4. D. Girela. Analytic functions of bounded mean oscillation. Complex function spaces (Mekrijärvi, 1999), 61-170, Univ. Joensuu Dept. Math. Rep. Ser., 4, Univ. Joensuu, Joensuu, 2001.

5. J. A. Peláez. Contribuciones a la teoría de ciertos espacios de funciones analíticas. Tesis Doctoral, Universidad de Málaga (2004).

6. D. Girela and M. A. Márquez. Analytic functions with $H\sp p$-derivative. Rocky Mountain J. Math. 35 (2005), no. 2, 517-530.

7. D. Girela, C. González and J. A. Peláez. Toeplitz operators and division by inner functions. Proceedings of the First Advanced Course in Operator Theory and Complex Analysis, 85--103, Univ. Sevilla Secr. Publ., Seville, 2006.

8. D. Girela, C. González and J. A. Peláez. Multiplication and division by inner functions in the space of Bloch functions. Proc. Amer. Math. Soc. 134 (2006), no. 5, 1309-1314.

9. D. Girela. A class of conformal mappings with applications to function spaces. Recent advances in operator-related function theory, 113-121, Contemp. Math. 393, Amer. Math. Soc., Providence, RI, 2006.

10. O. Blasco, D. Girela and M. A. Márquez. Embedding of analytic function spaces with given mean growth of the derivative. Math. Nachr. 279 (2006), no. 16, 1773-1782.

11. Hong Rae Cho and Jinkee Lee. Fatou theorem and embedding theorems for the mean Lipschitz functions on the unit ball. Commun. Korean Math. Soc. 24 (2009), n. 2, 187-195.

12. D. Girela and D. Suárez. On Blaschke products, Bloch functions and normal functions. Rev. Mat. Complutense  24, 1 (2011), 49-57.

D. Girela and M. A. Márquez. Mean growth of $H^p$ functions. Publ. Mat. 42 (1998), 301-318.

Cited in:

1. M. A. Márquez. Espacios de funciones analíticas caracterizados por propiedades de las derivadas de sus elementos. Tesis Doctoral, Universidad de Málaga (2000).

2. D. Girela and M. A. Márquez. Analytic functions with $H\sp p$-derivative. Rocky Mountain J. Math. 35 (2005), no. 2, 517-530.

D. Girela and M. A. Márquez. Some remarks on Carleson measures and $Q\sb p$ spaces. Complex analysis and differential equations (Uppsala, 1997), 169-178, Acta Univ. Upsaliensis Skr. Uppsala Univ. C Organ. Hist., 64, Uppsala Univ., Uppsala, 1999.

Cited in:

1. M. A. Márquez. Espacios de funciones analíticas caracterizados por propiedades de las derivadas de sus elementos. Tesis Doctoral, Universidad de Málaga (2000).

2. M. Essén and J. Xiao. $Q\sb p$ spaces- a survey. Complex function spaces (Mekrijärvi, 1999), 41--60, Univ. Joensuu Dept. Math. Rep. Ser., 4, Univ. Joensuu, Joensuu, 2001.

3. J. Xiao. Holomorphic  $Q$ classes. Lecture Notes in Mathematics, 1767. Springer-Verlag, Berlin, 2001.

D. Girela, M. Nowak and P. Waniurski. On the zeros of Bloch functions. Math. Proc. Cambridge Philos. Soc. 129 (2000), no. 1, 117--128.

Cited in:

1. P. Waniurski. On zeros of Bloch functions and related spaces of analytic functions. Ann. Univ. Mariae Curie-Sk odowska Sect. A 54 (2000), 149-158.

2. M. Nowak. On zeros of normal functions. Ann. Acad. Sci. Fenn. Math. 27 (2002), no. 2, 381-390.

3. O. Blasco, A. Kukuryka, and M. Nowak. Luecking's condition for zeros of analytic functions. Ann. Univ. Mariae Curie-Sklodowska Sect. A 58 (2004), 1-15.

4. P. Waniurski. On zeros of functions in Bergman and Bloch spaces. Ann. Univ. Mariae Curie-Sklodowska Sect. A 57 (2003),  99-108.

5. D. Girela. Some questions on Bloch functions. Technical Report n. 7, Department of Mathematics, Aristotle University of Thessaloniki (2003), 9 pp.

6. J. A. Peláez. Contribuciones a la teoría de ciertos espacios de funciones analíticas. Tesis Doctoral, Universidad de Málaga (2004).

7. R. Supper. Croissance des finctions sou-harmoniques et des founctions entières dans C^N. Institute de Recherche Mathématique Avancée, Strasbourg, 2005.

8. D. Girela and J. A. Peláez. Growth properties and sequences of zeros of analytic functions in spaces of Dirichlet type. J. Aust. Math. Soc. 80 (2006), no. 3, 397-418.

9. R. Supper. Spherical means of subharmonic functions. Communications in Mathematical Analysis 7 (2009), n. 1, 61-74.

10. D. Girela and M. A. Márquez. Superposition operators between $Q_p$ spaces and Hardy spaces. J. Math. Anal. Appl. 364, n. 2, (2010), 463-472.

11. Jisoo Byun, Hong Rae Cho, Jong-Do Park. Weighted Lipschitz estimates for $\overline \partial$ on convex domains of finite type. J. Math. Anal. Appl  368, 1 (2010), 190-210.

12. Ch. Chatzifountas. Multipliers and integration operators in spaces of analytic functions. Ph. D. Thesis. Universidad de Málaga (2013).

13. J. A. Peláez and J. Rättyä. Weighted Bergman spaces induced by rapidly increasing weights. Memoirs of the American Mathematical Society, Vol. 227, N. 1066 (2014).

D. Girela. Logarithmic coefficients of univalent functions. Ann. Acad. Sci. Fenn. Math. 25 (2000), no. 2, 337-350.

Cited in:

1. Ye, Zhong Qiu. The Logarithmic Coefficients of a Subcategory Univalent Functions. J. Univ. Sci. Technol. Suzhou, Nat. Sci. 21, No. 2, 28-32 (2004).

2. Ning, Ju Hong; Ye, Zhong Qiu. Successive coefficients of circularly symmetric functions. (Chinese) J. Math. Study 38 (2005), no. 3, 286-291.

3. J. L. Li. Notes on the Duren-Leung conjecture. J. Math. Anal. Appl. 332 (2007), no. 1, 164--170.

4. Zhongqiu Ye. The logarithmic coefficients of close-to-convex functions. Bull. Inst. Math. Acad. Sin. (N.S.) 3 (2008), 3, 445-452.

5. J. L. Li. On the logarithmic coefficients and integral means of univalent functions. Mat. Zametki 85 (2009), 1, 131-133, translation in Math. Notes 85 (2009), 1-2, 120-122.

6. Qin Deng. On circularly symmetric functions. Applied  Math. Letters  23 (2010), 1483-1488.
7. Qin Deng. On the logarithmic coefficients of Bazilevic˘ functions. Appl. Math. Comput. 217, 12 (2011), 5889-5894.
8. Qin Deng. On the coefficients of Bazilevic˘ functions and circularly symmetric functions.  Applied Mathematics Letters  24 (2011), n. 6, 991-995.
9. Z. Ye. The coefficients of Bazilevic˘ functions. To appear in Complex Variables and Elliptic Functions. 58 (2013), n. 11, 1559-1567.
10. Sh. Najafzadeh and A. Ebadian. On univalent functions with logarithmic coefficients by using convolution. Theory and Applications of  Mathematics and Computer  Science 3 (1) (2013), 85-89.

K. M. Dyakonov and D. Girela. On $Q\sb p$ spaces and pseudoanalytic extension. Ann. Acad. Sci. Fenn. Math. 25 (2000), no. 2, 477--486.

Cited in:

1. M. A. Márquez. Espacios de funciones analíticas caracterizados por propiedades de las derivadas de sus elementos. Tesis Doctoral, Universidad de Málaga (2000).

2. J. Xiao. Holomorphic  $Q$ classes. Lecture Notes in Mathematics, 1767. Springer-Verlag, Berlin, 2001.

3. M. Essén and J. Xiao. $Q\sb p$ spaces- a survey. Complex function spaces (Mekrijärvi, 1999), 41--60, Univ. Joensuu Dept. Math. Rep. Ser., 4, Univ. Joensuu, Joensuu, 2001.

4. J.J. Donaire, D. Girela and D. Vukotic. On univalent functions in some Möbius invariant spaces. J. Reine Angew. Math. 553 (2002), 43-72.

5. D. Girela and C. González. Division by inner functions. Progress in analysis, Vol. I, II (Berlin, 2001), 215--220, World Sci. Publ., River Edge, NJ, (2003).

6. J. A. Peláez. Contribuciones a la teoría de ciertos espacios de funciones analíticas. Tesis Doctoral, Universidad de Málaga (2004).

7. H. Wulan. Quotient decomposition of $Q\sp {\sharp}\sb p$ functions. Ann. Acad. Sci. Fenn. Math. 29 (2004), no. 2, 283--293.

8. D. Girela and C. González. Multiplication and division by inner functions in the space of Bloch functions. Proc. Amer. Math. Soc. 134 (2006), no. 5, 1309-1314.

9. D. Girela, C. González and J. A. Peláez. Toeplitz operators and division by inner functions. Proceedings of the First Advanced Course in Operator Theory and Complex Analysis, 85--103, Univ. Sevilla Secr. Publ., Seville, 2006.

10. Xiaonan Li. On hyperbolic $Q$ classes. Dissertation, University of Joensuu, Joensuu, 2005. Ann. Acad. Sci. Fenn. Math. Diss. No. 145 (2005), 65 pp.

11. R. F. Shamoyan. BMO-type characterizations, the diagonal map and integral operators in some spaces of analytic functions (in Russian). Vladikavkaz J. 9 (2007), n. 2, 40-53.

12. J. A. Peláez. Inner functions as improving multipliers. J. Functional Analysis 225 (2008), n. 6, 1403-1418.

13. K. M. Dyakonov.  Toeplitz operators and arguments of analytic functions.  Math. Ann. 344 (2009), n. 2, 353-380.

14. J. Pau and J. A. Peláez. On the zeros of functions in Dirichlet-type spaces. Trans. Amer. Math. Soc. 363 (2011), n. 4, 1981-2002.

15. A. El-Sayed Ahmed and A. Kamal. Carleson measure characterizations of $Q_k(p,q)$ spaces. Journal of International Math. Vitual Institute  3 (2013), 1-21.
     

D. Girela and C. González. Some results on mean Lipschitz spaces of analytic functions. Rocky Mountain J. Math. 30 (2000), no. 3, 901-922.

Cited in:

1. M. A. Márquez. Espacios de funciones analíticas caracterizados por propiedades de las derivadas de sus elementos. Tesis Doctoral, Universidad de Málaga (2000).

2. D. Girela. Analytic functions of bounded mean oscillation. Complex function spaces (Mekrijärvi, 1999), 61-170, Univ. Joensuu Dept. Math. Rep. Ser., 4, Univ. Joensuu, Joensuu, 2001.

3. J. A. Peláez. Contribuciones a la teoría de ciertos espacios de funciones analíticas. Tesis Doctoral, Universidad de Málaga (2004).

4. J. Godula and V. V. Starkov. Remarks on the boundary behavior of Bloch functions. (Russian) Izv. Vyssh. Uchebn. Zaved. Mat. 2005 , no. 4, 30-37; translation in Russian Math. (Iz. VUZ) 49 (2005), no. 4, 27-34 (2006).

5. D. Girela and M. A. Márquez. Analytic functions with $H\sp p$-derivative. Rocky Mountain J. Math. 35 (2005), no. 2, 517--530.

6. E. G. Kwon. Quantities equivalent to the norm of a weighted Bergman space. J. Math. Anal Appl.  38, 2, (2008), 758-770.

7. E. G. Kwon. On a secure weight related to a weighted Bergman space. Proceedings of the 16th International Conference on finite or infinite dimensional complex anlysis and applications. (2009). 154-158.

D. Girela. Analytic functions of bounded mean oscillation. Complex function spaces (Mekrijärvi, 1999), 61-170, Univ. Joensuu Dept. Math. Rep. Ser., 4, Univ. Joensuu, Joensuu, 2001.

Cited in:

1. J. Xiao. Holomorphic  $Q$ classes. Lecture Notes in Mathematics, 1767. Springer-Verlag, Berlin, 2001.

2. R. Zhao. On logarithmic Carleson measures. Acta Sci. Math. (Szeged) 69 (2003), no. 3-4, 605-618.

3. A. El-Sayed. On some classes and spaces of  holomorphic and hyperholomorphic functions. Doctoral Dissertation. Bahaus Univertätimar, 2003.

4. V. Álvarez, M. A. Márquez and D. Vukotic. Superposition operators between the Bloch space and Bergman spaces. Ark. Mat. 42 (2004), no. 2, 205--216.

5. C. A. Cazaku and V. Stanciu. BMO-mappings in the plane. Topics in analysis and its applications, 11--30, NATO Sci. Ser. II Math. Phys. Chem., 147, Kluwer Acad. Publ., Dordrecht, 2004.

6. J. A. Peláez. Contribuciones a la teoría de ciertos espacios de funciones analíticas. Tesis Doctoral, Universidad de Málaga (2004).

7. K. Zhu. Spaces of holomorphic functions in the unit ball of $C^n$. Springer-Verlag (GTM 226), 2004.

8. D. Girela and M. A. Márquez. Analytic functions with $H\sp p$-derivative. Rocky Mountain J. Math. 35 (2005), no. 2, 517-530.

9. J. Laitila. Weakly compact composition operators on vector-valued BMOA. J. Math. Anal. Appl. 308 (2005), no. 2, 730--745.

10. M. R. Agrawal, P. G. Howlett,  S. K. Lucas,  S. Naik,  S. Ponnusamy.  Boundedness of generalized Cesáro averaging operators on certain function spaces. J. Comput. Appl. Math. 180 (2005), no. 2, 333--344.

11. O. Blasco and M. A. Pérez. On functions of integrable mean oscillation. Rev. Mat. Complut. 18 (2005), no. 2, 465--477.

12. D. Girela and J. A: Peláez. Non-stable classes of analytic functions. Int. J. Pure Appl. Math. 21 (2005), no. 4, 553--563.

13. D. Girela, C. González and J. A. Peláez. Toeplitz operators and division by inner functions. Proceedings of the First Advanced Course in Operator Theory and Complex Analysis, 85--103, Univ. Sevilla Secr. Publ., Seville, 2006.

14. D. Girela. A class of conformal mappings with applications to function spaces. Recent advances in operator-related function theory, 113-121, Contemp. Math. 393, Amer. Math. Soc., Providence, RI, 2006.

15. J. Laitila. Composition operators on vector-valued BMOA and related function spaces. Doctoral Dissertation. University of Helsinki, 2006.

16. M. Pavlovic and J. Xiao. Splitting planar isoperimetric inequality through preduality of $Q\sb p, 0<p<1$. J. Funct. Anal. 233 (2006), no. 1, 40-59.

17. D. Girela and J. A. Peláez. Carleson measures, multipliers and integration operators for spaces of Dirichlet type. J. Funct. Anal. 241 (2006), no. 1, 334-358.

18. D. Girela, M. Pavlovic and J. A. Peláez. Spaces of analytic functions of Hardy-Bloch type. J. Anal. Math. 100 (2006), 53-81.

19. J. Laitila. Composition operators and vector-valued BMOA. Integral Equations Operator Theory 58 (2007), no. 4, 487-502.

20. D. Girela. Conformal mappings and spaces of analytic functions. Function Spaces and Classes. Joensuu 2006. 9-31. Univ. Joensuu Dept. Math. Rep. Ser., 12,  Univ. Joensuu, Joensuu, 2007.

21. D. Girela, J. A. Peláez and D. Vukotic. Uniformly discrete sequences in regions with tangencial approach to the unit circle. Complex Variables and Elliptic Functions  52, nos. 2-3 (2007)161-173.

22. R. Zhao. On Carleson measures. Function Spaces and Classes. Joensuu 2006. 57-78. Univ. Joensuu Dept. Math. Rep. Ser., 12, Univ. Joensuu, Joensuu, 2007.

23. K. Zhu. A class of Möbius invariant function spaces.  Illinois J. Math. 51, 3 (2007), 977-1002.

24. O. Furdui. On a class of lacunary series in BMOA. J. Math. Anal. Appl. 342, 2 (2008), 773-779.

25. E. Saksman and H. O. Tylli. New examples of weakly compact approximation in Banach spaces. Ann. Acad. Sci. Fenn. Math. 33 (2008), 429-438.

26. J. A. Peláez. Inner functions as improving multipliers. J. Functional Analysis 225 (2008), n. 6, 1403-1418.

27. H. Wulan and K. Zhu. Bloch and BMO functions in the unit ball.  Complex Variables and Elliptic Functions 53 (2008), n. 11, 1009-1019.

28. J. Laitila. Weighted composition operators on BMOA. Computational Methods and Function Theory 9 (2009), n. 1, 27-46.

29. J. Laitila, H. O. Tylli and M. Wang. Composition operators from weak to strong spaces of vector-values analytic functions. J. Operator Theory 62:2 (2009), 281-295.

30. J. Pau and J. A. Peláez. Multipliers of Möbius invariant $Q_s$ spaces. Math Z..261 (2009), 3, 545-555.

31. J. Pau and J. A. Peláez. Logarithms of the derivative of univalent functions in $Q_p$ spces. J. Math. Anal. Appl. 350 (2009), n. 1, 184-194.

32. J. Laitila. Isometric composition operators on BMOA. To appear in Math. Nachr.  283 (2010), n. 11, 1646-1653.

33. D. Girela and M. A. Márquez. Superposition operators between $Q_p$ spaces and Hardy spaces. J. Math. Anal. Appl. 364, n. 2, (2010), 463-472.

34. P. Galanopoulos and J. A. Peláez. A Hankel matrix acting on Hardy and Bergman spaces. Studia Math. 200 (2010), n. 1-3, 201-220.

35. J. J. Donaire, D. Girela and D. Vulotic. On the growth and range of functions in Möbius invariant spaces. J. d´Analyse Math. 112 (2010), 237-260.

36. D. Girela and D. Suárez. On Blaschke products, Bloch functions and normal functions.  Rev. Mat. Complutense  24, 1 (2011), 49-57.

37. D. Girela, C. González and M. Jevtic. Inner functions in Lipschitz, Besov, and Sobolev spaces. Abstract and Applied Analysis. Volume 2011, Article ID 626254, 26 pages.

38. P. Galanopoulos, D. Girela and R. Hernández. Univalent functions, VMOA and related spaces. J. Geometric Analysis 21 (2011), n.3, 665-682.

39. J. Laitila, S. Miihkinen and P. Nieminen. Essential norms and weak compactness of integration operators. Arch. Math. (Basel) 97 (2011), no. 1, 39–48.

40. R. W. Ibrahim. Stability of admissible functions. Int. J. Math. Math. Sci. 2011, Art. ID 342895, 7 pp.

41. J. Liu, Z. Lou and Ch. Xiong. Essential norms of integral operators on spaces os analytic functions.  Nonlinear Analysis: Theory Methods Appl.  75 (2012), 5145-5156.

42. J. M. Cohen, F. Colonna and D. Singman. Carleson measures on a homogeneous tree.  J. Math. Anal. Appl. 395, n. 1, (2012), 403-412.

43. J. Laitila, P. J. Nieminen, E. Saksman and H. O. Tylli. Compact and weakly compact composition operators on BMOA. Complex Analysis and Operator Theory  7 (2013), n. 1, 163-181.

44. P. Galanopoulos, D. Girela and M. J. Martín. Besov spaces, multipliers, and univalent functions. Complex Analysis and Operator Theory 7 (2013), n. 4, 1081-116.

45. G. Stylogiannis. A weighted composition semigroup on BMOA. Complex Analysis and Operator Theory  7 (2013), n. 4, 945-964.

46. J. Liu and Ch. Chiong. Norm attaining integral operators on analytic function spaces.  J. Math. Anal. Appl. 399, n. 1 (2013), 108-115.

47. F. Colonna. Weighted composition operators between $H^\infty $ and $BMOA$, Bull. Korean Math. Soc.  50 (2013), n. 1, 185-200.

48. F. Colonna and M. Tjani. Weighted composition operators from the Besov space into the weighted-type space $H^\infty_\mu $. J. Math. Anal. Appl. 402 (2013), n. 2, 594-611.

49. P. Galindo, J. Laitila and M. Lindstrom. Essential norm estimates for composition operators on BMOA. J. Func. Analysis.  265 (2013), 4, 629-643.

50. J. Liu, Z. Lou and A. K. Sharma. Weighted differentiation composition operators to Bloch-type spaces. Abstract and Applied Analysis, Vol 2013 (2013), Article ID 151929, 9 pages.

51. Ch. Chatzifountas. Multipliers and integration operators in spaces of analytic functions. Ph. D. Thesis. Universidad de Málaga (2013).

52. J. A. Peláez and J. Rättyä. Weighted Bergman spaces induced by rapidly increasing weights. Memoirs of the American Mathematical Society, Vol. 227, N. 1066 (2014).

53. Ch. Chatzifountas, D. Girela and J. A. Peláez. Multipliers of Dirichlet subspaces of the Bloch spaces. To appear in Journal of Operator Theory.

54. Xiaoming Wu and Shanli Ye. On a logarithmic Hardy-Bloch type space. To appear in Rocky Mountain J. Math.

R. Aulaskari, D. Girela and H. Wulan. Taylor coefficients and mean growth of the derivative of $Q\sb p$ functions. J. Math. Anal. Appl. 258 (2001), no. 2, 415--428.

Cited in:

1. M. Essén and J. Xiao. $Q\sb p$ spaces- a survey. Complex function spaces (Mekrijärvi, 1999), 41--60, Univ. Joensuu Dept. Math. Rep. Ser., 4, Univ. Joensuu, Joensuu, 2001.

2. J. Xiao. Holomorphic  $Q$ classes. Lecture Notes in Mathematics, 1767. Springer-Verlag, Berlin, 2001.

3. D. Girela. Analytic functions of bounded mean oscillation. Complex function spaces (Mekrijärvi, 1999), 61--170, Univ. Joensuu Dept. Math. Rep. Ser., 4, Univ. Joensuu, Joensuu, 2001.

4. A. El-Sayed Ahmed. On some classes and spaces of  holomorphic and hyperholomorphic functions. Doctoral Dissertation. Bahaus Univertätimar, 2003.

5. J. Rättyä. $n$-th derivative characterisations, mean growth of derivatives and $F(p,q,s)$. Bull. Austral. Math. Soc. 68 (2003), no. 3, 405-421.

6. K. Gürlebeck and A. El-Sayed Ahemed. On series expansions of hyperholomosrphic $B\sp {q}$ functions. Advances in analysis and geometry, 113-129, Trends Math., Birkhäuser, Basel, 2004.

7. M. Pavlovic. Hadamard product in $Q\sb p$ spaces. J. Math. Anal. Appl. 305 (2005), no. 2, 589--598.

8. Xiaonan Li. On hyperbolic $Q$ classes. Dissertation, University of Joensuu, Joensuu, 2005. Ann. Acad. Sci. Fenn. Math. Diss. No. 145 (2005), 65 pp.

9. A. El-Sayed Ahmed, K. Gürlebeck, L. F. Reséndis and L. M. Tovar. Characterizations for Bloch space by $\bold B\sp {\bold p,\bold q}$ spaces in Clifford analysis. Complex Var. Elliptic Equ. 51 (2006), no. 2, 119-136.

10. H. Wulan. Möbius invariant $Q\sb p$ spaces: results, techniques and questions. Adv. Math. (China) 34 (2005), no. 4, 385-404.

11. H. Wulan and Y. Zhang. Hadamard products and $Q_K$ spaces. J. Math. Anal. Appl. 337 (2008), 1142-1150.

12. A. El-Sayed Ahmed. Criteria for functions to be weighted Bloch.  J. Computational Analysis and Applications  11 (2009), n. 2, 252-262.

13. Zhen Yang. Hadamard products in Lipschitz spaces. Journal of Shantou University (Natural Science Edition) 24 (2009), n. 4, 14-20.

14. H. Li, H. Wulan and Ji Zhen Zhou. Lipschitz spaces and $Q_K$ type spaces. Science China Math. 53 (2010), n. 3, 771-778.

R. Aulaskari, D. Girela and H. Wulan. $Q\sb p$ spaces, Hadamard products and Carleson measures. Travaux de la Conférence Internationale d'Analyse Complexe et du 8e Séminaire Roumano-Finlandais (Iassy, 1999). Math. Rep. (Bucur.) 2(52) (2000), no. 4, 421--430 (2001).

Cited in:

1. M. Essén and J. Xiao. $Q\sb p$ spaces- a survey. Complex function spaces (Mekrijärvi, 1999), 41-60, Univ. Joensuu Dept. Math. Rep. Ser., 4, Univ. Joensuu, Joensuu, 2001.

2. J. Xiao. Holomorphic  $Q$ classes. Lecture Notes in Mathematics, 1767. Springer-Verlag, Berlin, 2001.

3. Li-jian Jiang. Composition operators on $F$-algebra $N\sb p$ and $N\sp *\sb p$. Pure Appl. Math. (Xi'an) 17 (2001), no. 3, 256--260. 

4. Xiaonan Li. An equivalent condition for $Q_p$ function spaces. J. Shantou Univ. Natural Science Edition  17 (2002), 1-4.

5. H. Wulan. Möbius invariant $Q\sb p$ spaces: results, techniques and questions. Adv. Math. (China) 34 (2005), no. 4, 385-404.

6. Wang Maofa. Composition Operators on analytic vector-valued Nevanlinna classes. Acta Math. Scientia  25 (2005), n. 4, 781-780.

7. A. El-Sayed Ahmed and M. A. Bakhit. Hadamard products and N_k space. Mathematical and Computer Modelling 51, 1-2, (2010), 33-43.

8. A. El-Sayed Ahmed and A. Kamal. Carleson measure characterizations of $Q_k(p,q)$ spaces. Journal of International Math. Vitual Institute  3 (2013), 1-21.

9. K. Zhao. Carleson measures and tent spaces on the Siegel upper half space.  Abstract and Applied Analysis, Vol. 2102, article ID 583156.

D. Girela and C. González. Mean growth of the derivative of infinite Blaschke products. Complex Variables Theory Appl. 45 (2001), no. 1, 1-10.

Cited in:

1. D. Girela. Analytic functions of bounded mean oscillation. Complex function spaces (Mekrijärvi, 1999), 61-170, Univ. Joensuu Dept. Math. Rep. Ser., 4, Univ. Joensuu, Joensuu, 2001.

2. D. Girela and C. González. Division by inner functions. Progress in analysis, Vol. I, II (Berlin, 2001), 215--220, World Sci. Publ., River Edge, NJ, (2003).

3. J. A. Peláez. Blaschke products with zeros in a Stolz angle. Technical Report n. 8, Department of Mathematics, Aristotle University of Thessaloniki (2003), 13 pp.

4. D. Girela and J. A. Peláez. On the derivative of infinite Blaschke products. Illinois J. Math. 48 (2004), no. 1, 121-130.

5. J. A. Peláez. Contribuciones a la teoría de ciertos espacios de funciones analíticas. Tesis Doctoral, Universidad de Málaga (2004).

6. D. Girela and M. A. Márquez. Analytic functions with $H\sp p$-derivative. Rocky Mountain J. Math. 35 (2005), no. 2, 517-530.

7. D. Girela. A class of conformal mappings with applications to function spaces. Recent advances in operator-related function theory, 113-121, Contemp. Math. 393, Amer. Math. Soc., Providence, RI, 2006.

8. D. Girela, J. A. Peláez and D. Vukotic. Integrability of the derivative of a Blaschke product. Proc. Edinburgh Math. Soc. 50, 3 (2007), 673-687.

9. F. Pérez González and J. Rättyä. Inner functions in the Möbius invariant Besov-type spaces. Proc. Edinburgh Math. Soc. 52 (2009), 751-770.

10. D. Girela and D. Suárez. On Blaschke products, Bloch functions and normal functions.  Rev. Mat. Complutense  24, 1 (2011), 49-57.

J. J. Donaire, D. Girela and D. Vukotic. On univalent functions in some Möbius invariant spaces. J. Reine Angew. Math. 553 (2002), 43-72.

Cited in:

1. S. M. Buckley, J. L. Fernández and D. Vukotic. Superposition operators on Dirichlet type spaces. Papers on analysis, 41--61, Rep. Univ. Jyväskylä Dep. Math. Stat., 83, Univ. Jyväskylä, Jyväskylä, 2001.

2. D. Girela. Analytic functions of bounded mean oscillation. Complex function spaces (Mekrijärvi, 1999), 61-170, Univ. Joensuu Dept. Math. Rep. Ser., 4, Univ. Joensuu, Joensuu, 2001.

3. D. Vukotic. Integrability, growth of conformal maps and superposition operators. Technical Report n. 10, Department of Mathematics, Aristotle University of Thessaloniki (2003), 20 pp.

4. V. Álvarez, M. A. Márquez and D. Vukotic. Superposition operators between the Bloch space and Bergman spaces. Ark. Mat. 42 (2004), no. 2, 205--216.

5. D. Girela and J. A. Peláez. Non-stable classes of analytic functions. Int. J. Pure Appl. Math. 21 (2005), no. 4, 553-563.

6. J. Xiao. Some results on $Q\sb p$ spaces, $0<p<1$, continued. Forum Math. 17 (2005), no. 4, 637-668.

7. M. J. Martín. Operadores de composición y teoría geométrica. Tesis Doctoral. Universidad Autónoma de Madrid. 2005.

8. D. Girela and J. A. Peláez. Boundary behaviour of analytic functions in spaces of Dirichlet type. J. Inequal. Appl. 2006, Art. ID 92795, 12 pp.

9. J. Xiao. Geometric $Q\sb p$ functions. Frontiers in Mathematics. Birkhäuser Verlag, Basel, 2006.

10. M. J. Martín and D. Vukotic. Isometries of some classical function spaces among the composition operators. Recent advances in operator-related function theory, 133-138, Contemp. Math. 393, Amer. Math. Soc., Providence, RI, 2006.

11. D. Girela. Conformal mappings and spaces of analytic functions. Function Spaces and Classes. Joensuu 2006. 9-31. Univ. Joensuu Dept. Math. Rep. Ser., 12,  Univ. Joensuu, Joensuu, 2007.

12. F. Pérez González and J. Rättyä. Univalent functions in Hardy, Bergman, Bloch and related spaces. J. Anal. Math. 105 (2008), 125-128.

13. S. Buckley and D. Vukotic. Univalent interpolation in Besov spaces and superposition into Bergman spaces. Potential Analysis 29 (2008), n. 1, 1-16.

14. F. Pérez González and J. Rättyä. Inner functions in the Möbius invariant Besov-type spaces. Proc. Edinburgh Math. Soc. 52 (2009), 751-770.

15. J. J. Donaire, D. Girela and D. Vulotic. On the growth and range of functions in Möbius invariant spaces. J. d´Analyse Math. 112 (2010), 237-260.

16. P. Galanopoulos, D. Girela and J. A. Peláez. Multipliers and integration operators on Dirichlet spces. Trans. Amer. Math. Soc. 363 (2011), 1855-1886.

17. M. Pavlovic and J. A. Peláez. Remarks on the area theorem in the theory of univalent functions. Proc. Amer. Math. Soc. 139 (2011), 909-916.

18. P. Galanopoulos, D. Girela and R. Hernández. Univalent functions, VMOA and related spaces. J. Geometric Analysis 21 (2011), n.3, 665-682.

19. F. Pérez González and J. Rättyä. Univalent functions in the Möbius invariant $Q_K$-spces. Abstract and Applied Analysis, Vol 2011 (2011), Article ID 259796, 11 pages.

20. P. Galanopoulos, D. Girela and M. J. Martín. Besov spaces, multipliers, and univalent functions. Complex Analysis and Operator Theory 7 (2013), n. 4, 1081-116.

21. K. L. Avetisyan. Sharp inclusions and lacunary series in mixed-norm spaces on the polidisc. Complex Variables and Elliptic Functions  58 (2013), 2, 185-195.

22. A.El-Sayed Ahmed and S. Omran. Weightes superposition operators in some analytic functions spaces. J. Comput. Anal. Appl. 15 (2013), 6, 996-1005.

23. J. Gröhn and A. Nicolau. Inner functions in weak Besov spaces. To appear in J. Functional Analysis.

D. Girela and J. A. Peláez. On the derivative of infinite Blaschke products. Illinois J. Math. 48 (2004), no. 1, 121-130.

Cited in:

1. J. A. Peláez. Blaschke products with zeros in a Stolz angle. Technical Report n. 8, Department of Mathematics, Aristotle University of Thessaloniki (2003), 13 pp.

2. J. A. Peláez. Contribuciones a la teoría de ciertos espacios de funciones analíticas. Tesis Doctoral, Universidad de Málaga (2004).

3. D. Girela. A class of conformal mappings with applications to function spaces. Recent advances in operator-related function theory, 113-121, Contemp. Math.393, Amer. Math. Soc., Providence, RI, 2006.

4. D. Girela, J. A. Peláez and D. Vukotic. Integrability of the derivative of a Blaschke product. Proc. Edinburgh Math. Soc. 50, 3 (2007), 673-687.

5. A. Aleman and D. Vukotic. On Blaschke products with derivatives in Bergman spaces with normal weights.  J. Math. Anal. Appl. 361 (2010), n. 2, 492-505.

D. Girela and J. A. Peláez. Integral means of analytic functions. Ann. Acad. Sci. Fenn. Math. 29 (2004), no. 2, 459-469.

Cited in:

1. D. Girela and J. A. Peláez. Carleson measures for spaces of Dirichlet type. Integral Equations Operator Theory 55 (2006), no. 3, 415427.

2. D. Girela, M. Pavlovic and J. A. Peláez. Spaces of analytic functions of Hardy-Bloch type. J. Anal. Math. 100 (2006), 53--81.

3. S. Stevic. Area type inequalities and integral means of harmonic functions on the unit ball. J. Math. Soc. Japan 59 (2007), no. 2, 583-601.

4. K. L. Avetisyan. Hardy-Bloch type spaces and lacunary series on the polydisk. Glasg. Math. J. 49 (2007), no. 2, 345--356.

5. S. Stevic. On Bloch-type functions with Hadamard gaps. Abstract and Applied Analysis 2007,  Art. ID 39176, 8pp.

6. K. L. Avetisyan. Lacunary series and sharp estimates in weighted spaces of holomorphic functions. J. Contemp. Math. Anal.  42 (2007), no. 2, 69-93.

7. H. T. Kaptanoglu and E. Üreyen. Analytic properties of Besov spaces via Bergman projections.
   Proceedings of the International Conference on Complex Analysis and Dynamical Systems III, a conference in honor of D. Aharonov, L. Aizenberg, S. Krushkal and U. Srebo… .
   Contemporary Mathematics 455 (2008), 169-182.

8. Songxiao Li and S. Stevic. Weighted-Hardy functions with Hadamard gaps on the unit ball. Applied Mathematics and Computation 212 (2009), n. 1, 229-233..

9. K. L. Avetisyan. Weighted spaces of harmonic and holomorphic functions. Ph. D. Thesis, University of Yerevan. 2009.

10. K. L. Avetisyan. Lacunary series in mixed norm spaces in the disc. J. Contemp. Math. Anal. 45 (2010), n. 5. 258-265.

11. V. V. Savchuk and M. V. Savchuk. Estimates for the Fejér sums of holomorphic functions in Bloch classes (Ukrainian).  Theory of approximation and realated questions 7 (2010), n. 1, 264-273.

12. Sh. Chen, S. Ponnusamy and X. Wang. Recent results on harmonic and $p$-harmonic mappings. Proceedings of the ICM2010 Satellite Conference International Workshop  on Harmonic and Quasiconformal Mappings (HQM2010). Editors: D. Minda, S. Ponnusamy, and N. Shanmugalingam. J. Analysis, Vol 18 (2010), 99-12.

13. Sh. Chen, S. Ponnusamy, and X. Wang. Integral means and coefficients estimates of planar harmonic mappings. Ann. Acad. Sci. Fenn. Math. 37 (2012), 69-79.

14. K. L. Avetisyan. Sharp inclusions and lacunary series in mixed-norm spaces on the polidisc. Complex Variables and Elliptic Functions  58 (2013), 2, 185-195.

15. Sh. Chen and S. Ponnusamy. Lipschitz-type spaces and Hardy spaces on some classes of complex-valued functions. Integral Equations and Operator Theory  77 (2013), 261-278.

16. Shaolin Chen, Antti Rasila, and Xiantao Wang. Radial growth, Lipschitz and Dirichlet spaces on solutions to the Yukawa equation.  To appear in Israel J. Math.

17. Xiaoming Wu and Shanli Ye. On a logarithmic Hardy-Bloch type space. To appear in Rocky Mountain J. Math.

A. Baernstein, D. Girela and J. A. Peláez. Univalent functions, Hardy spaces and spaces of Dirichlet type. Illinois J. Math. 48 (2004), no. 3, 837--859.

Cited in:

1. J. A. Peláez. Contribuciones a la teoría de ciertos espacios de funciones analíticas. Tesis Doctoral, Universidad de Málaga (2004).

2. D. Girela and J. A. Peláez. Integral means of analytic functions. Ann. Acad. Sci. Fenn. Math. 29 (2004), no. 2, 459-469.

3. D. Girela and J. A. Peláez. Non-stable classes of analytic functions. Int. J. Pure Appl. Math. 21 (2005), no. 4, 553-563.

4. D. Girela and J. A. Peláez. Growth properties and sequences of zeros of analytic functions in spaces of Dirichlet type. J. Aust. Math. Soc. 80 (2006), no. 3, 397-418.

5. D. Girela, M. Pavlovic and J. A. Peláez. Spaces of analytic functions of Hardy-Bloch type. J. Anal. Math. 100 (2006), 53-81.

6. D. Girela and J. A. Peláez. Boundary behaviour of analytic functions in spaces of Dirichlet type. J. Inequal. Appl. 2006, Art. ID 92795, 12 pp.

7. H. T. Kaptanoglu. Carleson measures for Besov spaces on the ball with applications. J. Functional Analysis 250, no. 2, (2007), 483-520.

8. D. Girela. Conformal mappings and spaces of analytic functions. Function Spaces and Classes. Joensuu 2006. 9-31. Univ. Joensuu Dept. Math. Rep. Ser., 12,  Univ. Joensuu, Joensuu, 2007.

9. H. T. Kaptanoglu and E. Üreyen. Analytic properties of Besov spaces via Bergman projections. Proceedings of the International Conference on Complex Analysis and Dynamical Systems III, a conference in honor of D. Aharonov, L. Aizenberg, S. Krushkal and U. Srebo… .Contemporary Mathematics 455 (2008), 169-182.

10. M. Lengfield. A nested embedding theorem for Hardy-Lorentz spaces with applications to coefficients multiplier problems. Rocky Mountain J. Math. 38 (2008), n. 4, 1215-1252.

11. F. Pérez González and J. Rättyä. Univalent functions in Hardy, Bergman, Bloch and related spaces. J. Anal. Math. 105 (2008), 125-128.

12. Y. C. Kim and T. Sugawa. Uniformly locally univalent functions and Hardy spaces. J. Math. Anal. Appl. 353 (2009), n. 1, 61-67.

13. C. González and J. A. Peláez. Univalent functions in Hardy spaces in terms of the growth of arc-length. Journal of Geometric Analysis 19 (2009), n. 4, 755-771.

14. J. J. Donaire, D. Girela and D. Vulotic. On the growth and range of functions in Möbius invariant spaces.  J. d´Analyse Math. 112 (2010), 237-260.

15. D. Girela, C. González and M. Jevtic. Inner functions in Lipschitz, Besov, and Sobolev spaces. Abstract and Applied Analysis. Volume 2011, Article ID 626254, 26 pages.

16. M. Pavlovic and J. A. Peláez. Remarks on the area theorem in the theory of univalent functions. Proc. Amer. Math. Soc.  139 (2011), 909-916.

17. F. Pérez González and J. Rättyä. Univalent functions in the Möbius invariant $Q_K$-spces. Abstract and Applied Analysis, Vol 2011 (2011), Article ID 259796, 11 pages.

18. J. A. Meshes. A class of meromorphic functions of slow growth in the unit disk not containing any of their integrals.  J. Math. Anal. Appl. 396, n. 2, (2012), 855-863.

19. Ch. Chatzifountas. Multipliers and integration operators in spaces of analytic functions. Ph. D. Thesis. Universidad de Málaga (2013).

20. Ch. Chatzifountas, D. Girela and J. A. Peláez. Multipliers of Dirichlet subspaces of the Bloch spaces. To appear in Journal of Operator Theory.

D. Girela and J. A. Peláez. Non-stable classes of analytic functions. Int. J. Pure Appl. Math. 21 (2005), no. 4, 553--563.

Cited in:

1. D. Girela and J. A. Peláez. Boundary behaviour of analytic functions in spaces of Dirichlet type. J. Inequal. Appl. 2006, Art. ID 92795, 12 pp.

2. Yuan Cheng, Sanjay Kumar and Ze-Hua Zhou. Weighted composition operators on Dirichlet-type spaces and related $Q_q$ spaces. Publ. Math. Debrecen 80/1-2 (2012), 79-88.

D. Girela, M. A. Márquez and J. A. Peláez. On the zeros of functions in Bergman spaces and in some other related classes of functions. J. Math. Anal. Appl. 309 (2005), n. 2, 553-563.

Cited in:

1. J. Pau and J. A. Peláez. On the zeros of functions in Dirichlet-type spaces. Trans. Amer. Math. Soc. 363 (2011), n. 4, 1981-2002.

D. Girela and M. A. Márquez. Analytic functions with H^p derivative.  Rocky Mountain J. Math.  35 (2005)  517-530.

Cited in:

1. Xiaoming Wu and Shanli Ye. On a logarithmic Hardy-Bloch type space. To appear in Rocky Mountain J. Math.

D. Girela, C. González and J. A. Peláez. Multiplication and division by inner functions in the space of Bloch functions. Proc. Amer. Math. Soc. 134 (2006), no. 5, 1309—1314.

Cited in:

1. D. Girela. A class of conformal mappings with applications to function spaces. Recent advances in operator-related function theory, 113-121, Contemp. Math. 393, Amer. Math. Soc., Providence, RI, 2006.

2. D. Girela, C. González and J. A. Peláez. Toeplitz operators and division by inner functions. Proceedings of the First Advanced Course in Operator Theory and Complex Analysis, 85--103, Univ. Sevilla Secr. Publ., Seville, 2006.

3. D. Girela and D. Suárez. On Blaschke products, Bloch functions and normal functions. Rev. Mat. Complutense  24, 1 (2011), 49-57.

D. Girela and J. A. Peláez. Growth properties and sequences of zeros of analytic functions in spaces of Dirichlet type. J. Aust. Math. Soc. 80 (2006), no. 3, 397--418.

Cited in:

1. D. Girela and J. A. Peláez. Integral means of analytic functions. Ann. Acad. Sci. Fenn. Math. 29 (2004), no. 2, 459-469.

2. A. Baernstein, D. Girela and J. A. Peláez. Univalent functions, Hardy spaces and spaces of Dirichlet type. Illinois J. Math. 48 (2004), no. 3, 837-859.

3. D. Girela and J. A. Peláez. Carleson measures for spaces of Dirichlet type. Integral Equations and Operator Theory 55 (2006), no. 3, 415-427.

4. D. Girela and J. A. Peláez. Non-stable classes of analytic functions. Int. J. Pure Appl. Math. 21 (2005), no. 4, 553--563.

5. D. Girela, M. Pavlovic and J. A. Peláez. Spaces of analytic functions of Hardy-Bloch type. J. Anal. Math. 100 (2006), 5381.

6. D. Girela and J. A. Peláez. Boundary behaviour of analytic functions in spaces of Dirichlet type. J. Inequal. Appl. 2006, Art. ID 92795, 12 pp.

7. K. L. Avetisyan. Hardy-Bloch type spaces and lacunary series on the polydisk. Glasgow  Math. J. 49 (2007), no. 2, 345-356.

8. D. Girela. Conformal mappings and spaces of analytic functions. Function Spaces and Classes. Joensuu 2006. 9-31. Univ. Joensuu Dept. Math. Rep. Ser., 12,  Univ. Joensuu, Joensuu, 2007.

9. E. S. Doubtsov. Boundary behaviour of functions in Bergman-Sobolev spaces. Steklov Institute of Mathematics at St. Petersburg, preprint 17/2008.

10. K. L. Avetisyan. Weighted spaces of harmonic and holomorphic functions. Ph. D. Thesis, University of Yerevan. 2009.

11. K. L. Avetisyan. Lacunary series in mixed norm spaces in the disc. J. Contemp. Math. Anal. 45 (2010), n. 5. 258-265.

12. P. Galanopoulos, D. Girela and J. A. Peláez. Multipliers and integration operators on Dirichlet spaces. Trans. Amer. Math. Soc. 363 (2011), n. 4,  1855-1886.

13. K. L. Avetisyan. Sharp inclusions and lacunary series in mixed-norm spaces on the polidisc. Complex Variables and Elliptic Functions  58 (2013), 2, 185-195.

14. Ch. Chatzifountas. Multipliers and integration operators in spaces of analytic functions. Ph. D. Thesis. Universidad de Málaga (2013).

15. Ch. Chatzifountas, D. Girela and J. A. Peláez. Multipliers of Dirichlet subspaces of the Bloch spaces. To appear in Journal of Operator Theory.

D. Girela and J. A. Peláez. Carleson measures for spaces of Dirichlet type. Integral Equations and Operator Theory 55 (2006), no. 3, 415-427.

Cited in:

1. D. Girela and J. A. Peláez. Carleson measures, multipliers and integration operators for spaces of Dirichlet type. J. Functional Analysis 241 (2006), no. 1, 334-358.

2. D. Girela, M. Pavlovic and J. A. Peláez. Spaces of analytic functions of Hardy-Bloch type. J. Anal. Math. 100 (2006), 53-81.

3. D. Girela and J. A. Peláez. Boundary behaviour of analytic functions in spaces of Dirichlet type. J. Inequal. Appl. 2006, Art. ID 92795, 12 pp.

4. J. Rättyä. Linear differential equations with solutions in Hardy spaces. Complex Variables and Elliptic Functions 52 (2007), no. 9, 785-795.

5. D. Girela. Conformal mappings and spaces of analytic functions. Function Spaces and Classes. Joensuu 2006. 9-31. Univ. Joensuu Dept. Math. Rep. Ser., 12,  Univ. Joensuu, Joensuu, 2007.

6. H. T. Kaptanoglu. Carleson measures for Besov spaces on the ball with applications. J. Functional Analysis 250, no. 2, (2007), 483-520.

7. K. L. Avetisyan. Hardy-Bloch type spaces and lacunary series on the polydisk. Glasg. Math. J. 49 (2007), no. 2, 345--356.

8. N. Arcozzi, R. Rochberg and E. Sawyer. Some problems on Carleson measures for Besov-Sobolev spaces. Topics in Complex Analysis and Operator Theory, Proceedings of the Winter School held in Antequera, Malaga, Spain (February 5-9 2006). Serv. Publ. Universidad de Málaga (2007). 141-148.

9. D. Girela, J. A. Peláez, F. Pérez González and J. Rättyä. Carleson measures for the Bloch space. Integral Equations and Operator Theory 61 (2008), n. 4, 511-547.

10. K. L. Avetisyan. Weighted spaces of harmonic and holomorphic functions. Ph. D. Thesis, University of Yerevan. 2009.

11. S. Kumar. A study of weighted composition operators and analytic function theory. Ph. D. Thesis, University of Jammu (India) (2009).

12. K. L. Avetisyan. Lacunary series in mixed norm spaces in the disc. J. Contemp. Math. Anal. 45 (2010), n. 5. 258-265.

13. P. Galanopoulos, D. Girela and J. A. Peláez. Multipliers and integration operators on Dirichlet spces. Trans. Amer. Math. Soc. 363 (2011), n. 4,  1855-1886.

14. A. El-Sayed Ahmed and A. Kamal. Carleson measure characterizations of $Q_k(p,q)$ spaces. Journal of International Math. Vitual Institute  3 (2013), 1-21.

15. P. Galanopoulos, D. Girela and M. J. Martín. Besov spaces, multipliers, and univalent functions. Complex Analysis and Operator Theory 7 (2013), n. 4, 1081-116.

16. K. L. Avetisyan. Sharp inclusions and lacunary series in mixed-norm spaces on the polidisc. Complex Variables and Elliptic Functions  58 (2013), 2, 185-195.

17. Ch. Chatzifountas. Multipliers and integration operators in spaces of analytic functions. Ph. D. Thesis. Universidad de Málaga (2013).

18. Ch. Chatzifountas, D. Girela and J. A. Peláez. Multipliers of Dirichlet subspaces of the Bloch spaces. To appear in Journal of Operator Theory.

D. Girela and J. A. Peláez. On the membership in Bergman spaces of the derivative of a Blaschke product with zeros in a Stolz domain. Canad. Math. Bull. 49 (2006), no. 3, 381-388.

Cited in:

1. D. Girela, J. A. Peláez and D. Vukotic. Integrability of the derivative of a Blaschke product. Proc. Edinburgh Math. Soc. 50, 3 (2007), 673-687.

2. J. A. Peláez. Sharp results on the integrability of the derivative of an interpolating Blaschke product. Forum Math. 20, n. 6 (2008), 1039-1054.

3. D. Girela, J. A. Peláez and D. Vukotic. Interpolating Blaschke products: Stolz and tangential approach regions. Constr. Approx. 27 (2008), no. 2, 203--216.

4. F. Pérez González and J. Rättyä. Inner functions in the Möbius invariant Besov-type spaces. Proc. Edinburgh Math. Soc. 52 (2009), 751-770.

5. A. Aleman and D. Vukotic. On Blaschke products with derivatives in Bergman spaces with normal weights.  J. Math. Anal. Appl. 361 (2010), n. 2, 492-505.

6. S. Favorov and L. Golinskii. On critical points of Blaschke products. Matematychni Studii. V.34 (2010), No.2, 168-173.

7. D. Girela, C. González and M. Jevtic. Inner functions in Lipschitz, Besov, and Sobolev spaces. Abstract and Applied Analysis. Volume 2011, Article ID 626254, 26 pages.

8. J. Heittokangas. On interpolating Blaschke products and Blaschke-oscillatory equations. Constructive Approximation  34 (2011), n. 1, 1-21.

D. Girela and J. A. Peláez. Boundary behaviour of analytic functions in spaces of Dirichlet spaces. J. of Inequalities and Applications, Vol. 2006, (2006), Article ID 92795, 12 pages.

Cited in:

1. E. S. Doubtsov. Boundary behaviour of functions in Bergman-Sobolev spaces. Steklov Institute of Math. at St. Petersburgh, preprint 17/2008.

2. N. Arcozzi, R. Rochberg and E. Sawyer. Capacity, Carleson measures, boundary convergence, and exceptional sets. In "Perspective in Partial Differential Equations, Harmonic Analysis and Applications", a volume in honor of  V. G. Maz'da 70-th birthday, AMS Proceedings of Symposia in Pure and Applied Mathematics. Vol. 79 (2008), 1-20.

3. Y. C. Kim and T. Sugawa. Uniformly locally univalent functions and Hardy spaces. J. Math. Anal. Appl. 353 (2009), n. 1, 61-67.

D. Girela, M. Pavlovic and J. A. Peláez. Spaces of analytic functions of Hardy-Bloch type. J. Anal. Math. 100 (2006), 53--81.

Cited in:

1. M. Pavlovic and J. A. Peláez. Weighted integrals of higher order derivatives of analytic functions. Acta Sci. Math. (Szeged) 72 (2006), no. 1-2, 73-93.

2. D. Girela and J. A. Peláez. Carleson measures, multipliers and integration operators for spaces of Dirichlet type. J. Functional Analysis 241 (2006), no. 1, 334-358.

3. K. L. Avetisyan. Hardy-Bloch type spaces and lacunary series on the polydisk. Glasgow Math. J. 49 (2007), no. 2, 345--356.

4. D. Girela. Conformal mappings and spaces of analytic functions. Function Spaces and Classes. Joensuu 2006. 9-31. Univ. Joensuu Dept. Math. Rep. Ser., 12,  Univ. Joensuu, Joensuu, 2007.

5. K. L. Avetisyan. Lacunary series and sharp estimates in weighted spaces of holomorphic functions. J. Contemp. Math. Anal.  42 (2007), no. 2, 69-73.

6. F. Pérez González and J. Rättyä. Univalent functions in Hardy, Bergman, Bloch and related spaces. J. Anal. Math. 105 (2008), 125-128.

7. M. Jevtic. Blaschke products in Lipschitz spaces. Proc. Edinburgh Math. Soc. 52 (2009), n. 3, 689-705.

8. D. Girela, J. A. Peláez, F. Pérez González and J. Rättyä. Carleson measures for the Bloch space. Integral Equations and Operator Theory 61 (2008), n. 4, 511-547.

9. Y. C. Kim and T. Sugawa. Uniformly locally univalent functions and Hardy spaces. J. Math. Anal. Appl. 353 (2009), n. 1, 61-67.

10. C. González and J. A. Peláez. Univalent functions in Hardy spaces in terms of the growth of arc-length. Journal of Geometric Analysis 19 (2009), n. 4, 755-771.

11. P. Galanopoulos, D. Girela and J. A. Peláez. Multipliers and integration operators on Dirichlet spces. Trans. Amer. Math. Soc. 363 (2011), n. 4,  1855-1886.

12. K. L. Avetisyan. Weighted spaces of harmonic and holomorphic functions. Armenian J. Math. 2 (2009), n.4. (Doctoral Thesis, 225 p., University of Yerevan) 2009.

13. K. L. Avetisyan. Lacunary series in mixed norm spaces in the disc. J. Contemp. Math. Anal. 45 (2010), n. 5. 258-265.

14. M. Nowak and M. Pavlovic. On the Libera operator. J. Math. Anal. Appl.  370, 2 (2010), 588-599.

15. D. Girela, C. González and M. Jevtic. Inner functions in Lipschitz, Besov, and Sobolev spaces. Abstract and Applied Analysis. Volume 2011 (2011), Article ID 626254, 26 pages.

16. O. Blasco and M. Pavlovic. Coefficient multipliers on Banach spaces of analytic functions. Rev. Mat. Iberoamericana  27 (2011), n. 2, 415-447.

17. F. Pérez González and J. Rättyä. Univalent functions in the Möbius invariant $Q_K$-spces. Abstract and Applied Analysis, Vol 2011 (2011), Article ID 259796, 11 pages.

18. R. E. Castillo and J. C. Ramos Fernández. Sampling-type sets and composition operators on Bloch-type spces. Bol. Mat. 18 (1) (2011), 39-54.
19. K. L. Avetisyan. A note on mixed norm spaces of analytic functions. Australian J. Math. Anal. Appl. 9 (2012), n. 1,Art. 16, 6 pp.
20. Sh. Chen, S. Ponnusamy and X. Wang. Integral means and coefficients estimates of planar harmonic mappings. Ann. Acad. Sci. Fenn. Math. 37 (2012), 69-79.
21. J. A. Peláez and J. Rättyä. Generalized Hilbert operators on weighted Bergman spaces. Advances in Math. 240 (2013), 227-267.
22. Sh. Chen and S. Ponnusamy. Lipschitz-type spaces and Hardy spaces on some classes of complex-valued functions. Integral Equations and Operator Theory  77 (2013), 261-278.
23. M.Pavlovic. Analytic functions with decreasing coefficients and Hardy and Bloch spaces. Proc. Edinburgh Math. Soc. 56 (2013), 623-635.
24. J. A. Peláez and J. Rättyä. Generalized Hilbert operators on weighted Bergman spaces. Advances in Math. 240 (2013), 227-267.
25. Ch. Chatzifountas. Multipliers and integration operators in spaces of analytic functions. Ph. D. Thesis. Universidad de Málaga (2013).
26. Shaolin Chen, Antti Rasila, and Xiantao Wang. Radial growth, Lipschitz and Dirichlet spaces on solutions to the Yukawa equation.  To appear in Israel J. Math.
27. Xiaoming Wu and Shanli Ye. On a logarithmic Hardy-Bloch type space. To appear in Rocky Mountain J. Math.
28. E. Doubtsov. Weighted Bloch spaces and quadratic differentials. To appear in J. Math. Anal. Appl.
29. A. N. Petrov. Reverse estimates in logarithmic Bloch spaces. Arch. Math. (to appear).

D. Girela and J. A. Peláez. Carleson measures, multipliers and integration operators for spaces of Dirichlet type. J. Funct. Anal. 241 (2006), no. 1, 334-358.

Cited in:

1. Xue-bin Wang. Multipliers on the Dirichlet type spaces. Hunan Met. J. 2007, 3, 134-136.

2. J. A. Peláez. Sharp results on the integrability of the derivative of an interpolating Blaschke product. Forum Math. 20, n. 6 (2008), 1039-1054.

3. D. Girela, J. A. Peláez, F. Pérez González and J. Rättyä. Carleson measures for the Bloch space. Integral Equations and Operator Theory 61 (2008), n. 4, 511-547.

4. S. Kumar. Weighted composition operators between spaces of Dirichlet type. Revista Matemática Complutense 22 (2009), n. 2, 469-488.

5. S. Kumar. A study of weighted composition operators and analytic function theory. Ph. D. Thesis, University of Jammu (India) (2009).

6. P. Galanopoulos, D. Girela and J. A. Peláez. Multipliers and integration operators on Dirichlet spces. Trans.

7. A. Aleman and O. Constantin. Spectra of integration operators on weighted Bergman spaces. J. d'Analyse Math. 109, 1 (2009), 199-231.

8. A. Aleman and A. M. Persson. Resolvent estimates and decomposable extensions of generalized Cesàro operators. J. Func. Analysis 258, 1 (2010), 67-98.

9. Xiaofen Lü and Xiaomin Tang. Extended Cesàro operators from Bergman spaces to Besov spaces in the unit ball. Adv. Math. (China)  39 (2010), no. 2, 179–186.

10. J. Pau and J. A. Peláez.  Embedding theorems and integration operators on Bergman spaces with rapidly decreasing weights. J. Functional Analysis 259 (2010), n. 10, 2727-2756.

11. Ru Peng and Caiheng Ouyang. Riemann-Stieljes operators and multipliers on $Q_p$ spaces in the unit ball of $\mathbb C^n$. J. Math. Anal. Appl. 377, 1 (2011), 180-193.

12. C. Cascante and J. M. Ortega. Carleson measures for weighted holomorphic Besov spaces. Ark. Mat.  49 (2011), 31-59.

13. H. T. Kaptanoglu. Reproducing Kernels and Radial Differential Operators for Holomorphic and Harmonic Besov Spaces on Unit Balls: A Unified View. Computational Methods and Function Theory 10 (2011), 483-500.

14. Yuan Cheng, Sanjay Kumar and Ze-Hua Zhou. Weighted composition operators on Dirichlet-type spaces and related $Q_q$ spaces. Publ. Math. Debrecen 80/1-2 (2012), 79-88.

15. O. Constantin. A Volterra-type integration operator on Fock spaces. Proc. Amer. Math. Soc.  140 (2012), 4247-4257.

16. P. Galanopoulos, D. Girela and M. J. Martín. Besov spaces, multipliers, and univalent functions. Complex Analysis and Operator Theory 7 (2013), n. 4, 1081-116.

17. A. El-Sayed Ahmed and A. Kamal. Carleson measure characterizations of $Q_k(p,q)$ spaces. Journal of International Math. Vitual Institute  3 (2013), 1-21.

18. Ru Peng and Caiheng Ouyang. Carleson measures for Besov-Sobolev spaces with applications in the unit ball in $\mathbb C^n$.  Acta Math. Sci.  33 B (5) (2013), 1219-1230.

19. Ch. Chatzifountas. Multipliers and integration operators in spaces of analytic functions. Ph. D. Thesis. Universidad de Málaga (2013).

20. Ch. Chatzifountas, D. Girela and J. A. Peláez. Multipliers of Dirichlet subspaces of the Bloch spaces. To appear in Journal of Operator Theory.

D. Girela, A class of conformal mappings with applications to function spaces, in Recent advances in operator-related function theory, Contemp. Math., 393, Amer. Math. Soc., Providence, RI, (2006), 113-121.

Cited in:

1. D. Girela and D. Suárez. On Blaschke products, Bloch functions and normal functions. Rev. Mat. Complutense 24 (2011), n. 1, 49-57.

D. Girela, J. A. Peláez and D. Vukotic. Integrability of the derivative of a Blaschke product. Proc. Edinburgh Math. Soc. 50, 3 (2007), 673-687.

Cited in:

1. D. Protas. Mean growth of the derivative of a Blaschke product. Kodai Math. J. 27 (2004), no. 3, 354--359.

2. D. Girela and J. A. Peláez. On the membership in Bergman spaces of the derivative of a Blaschke product with zeros in a Stolz domain. Canad. Math. Bull. 49 (2006), no. 3, 381-388.

3. D. Girela, J. A. Peláez and D. Vukotic. Uniformly discrete sequences in regions with tangential approach to the unit circle. Complex Var. Elliptic Equ. 52 (2007), no. 2-3, 161--173.

4. D. Girela, J. A. Peláez and D. Vukotic. Interpolating Blaschke products: Stolz and tangential approach regions. Constr. Approx. 27 (2008), no. 2, 203--216.

5. J. A. Peláez. Sharp results on the integrability of the derivative of an interpolating Blaschke product. Forum Math. 20, n. 6 (2008), 1039-1054.

6. M. Jevtic. Blaschke products in Lipschitz spaces. Proc. Edinburgh Math. Soc. 52 (2009), n. 3, 689-705.

7. J. A. Peláez. Inner functions as improving multipliers. J. Functional Analysis 225 (2008), n. 6, 1403-1418.

8. F. Pérez González and J. Rättyä. Inner functions in the Möbius invariant Besov-type spaces. Proc. Edinburgh Math. Soc. 52 (2009), 751-770.

9. A. Aleman and D. Vukotic. On Blaschke products with derivatives in Bergman spaces with normal weights.  J. Math. Anal. Appl. 361 (2010), n. 2, 492-505.

10. I. Chyzhykov. Argument of bounded analytic functions and Frostman's type conditions. Illinois J. Math. 53 (2009), n. 2, 515-531.

11. D. Van Vliet. Properties of a nonlinear Blaschke product decomposition algorithm. Advances in Adaptive Data Analysis 1 (2009), n. 4, 529-542.

12. J. J. Donaire, D. Girela and D. Vulotic. On the growth and range of functions in Möbius invariant spaces. J. d´Analyse Math.  112 (2010), 237-260.

13. D. Protas. Blaschke products with derivative in function spaces. Kodai Math. J.  34 (2011), n. 1, 124-131.

14. S. Favorov and L. Golinskii. On critical points of Blaschke products. Matematychni Studii. V.34 (2010), No.2, 168-173.

15. D. Girela, C. González and M. Jevtic. Inner functions in Lipschitz, Besov, and Sobolev spaces. Abstract and Applied Analysis. Volume 2011, Article ID 626254, 26 pages.

16. J. Heittokangas. On interpolating Blaschke products and Blaschke-oscillatory equations. Constructive Approximation  34 (2011), n. 1, 1-21.

17. J. Heittokangas. A survey on Blaschke-oscillatory differential equations, with updates.  In "Blaschke products and their applications". Fields Institute Communications, Vol 65 (2013), 43-98.

18. J. Mashreghi. The derivative of a Blaschke product. In "Derivatives of inner functions". Fields Institute Monographs, Vol 31 (2013), 99-124.

19. J. A. Cima and A. Nicolau. Inner functions with derivative in the weak Hardy spaces. To appear in Proc. Amer. Math. Soc.

20. J. Gröhn and A. Nicolau. Inner functions in weak Besov spaces. To appear in J. Functional Analysis.

D. Girela, J. A. Peláez and D. Vukotic. Uniformly discrete sequences in regions with tangential approach to the unit circle. Complex Var. Elliptic Equ. 52 (2007), no. 2-3, 161-173.

Cited in:

1. J. A. Peláez. Sharp results on the integrability of the derivative of an interpolating Blaschke product. Forum Math. 20, n. 6 (2008), 1039-1054.

2. D. Girela, J. A. Peláez, F. Pérez González and J. Rättyä. Carleson measures for the Bloch space. Integral Equations and Operator Theory 61 (2008), n. 4, 511-547.

3. A. Aleman and D. Vukotic. On Blaschke products with derivatives in Bergman spaces with normal weights.  J. Math. Anal. Appl. 361 (2010), n. 2, 492-505.

4. J. Heittokangas. On interpolating Blaschke products and Blaschke-oscillatory equations. Constructive Approximation  34 (2011), n. 1, 1-21.

5. J. Heittokangas. A survey on Blaschke-oscillatory differential equations, with updates.  In "Blaschke products and their applications". Fields Institute Communications, Vol 65 (2013), 43-98.

D. Girela, J. A. Peláez and D. Vukotic. Interpolating Blaschke products: Stolz and tangential approach regions. Constr. Approx. 27 (2008), no. 2, 203--216.

Cited in:

1. P. L. Duren, A. Schuster and D. Vukotic. On uniformly discrete sequences in the disk. Quadrature domains and their applications, 131--150, Oper. Theory Adv. Appl., 156, Birkhäuser, Basel, 2005.

2. D. Girela, M. A. Márquez and J. A. Peláez. On the zeros of functions in Bergman spaces and in some other related classes of functions. J. Math. Anal. Appl. 309 (2005), n. 2, 553-563.

3. D. Girela, J. A. Peláez and D. Vukotic. Uniformly discrete sequences in regions with tangential approach to the unit circle. Complex Var. Elliptic Equ. 52 (2007), no. 2-3, 161-173.

4. J. A. Peláez. Sharp results on the integrability of the derivative of an interpolating Blaschke product. Forum Math. 20, n. 6 (2008), 1039-1054.

5. F. Pérez González and J. Rättyä. Inner functions in the Möbius invariant Besov-type spaces. Proc. Edinburgh Math. Soc. 52 (2009), 751-770.

6. A. Aleman and D. Vukotic. On Blaschke products with derivatives in Bergman spaces with normal weights.  J. Math. Anal. Appl. 361 (2010), n. 2, 492-505.

7. S. Favorov and L. Golinskii. On critical points of Blaschke products. Matematychni Studii. V.34 (2010), No.2, 168-173.

8. D. Girela, C. González and M. Jevtic. Inner functions in Lipschitz, Besov, and Sobolev spaces. Abstract and Applied Analysis. Volume 2011, Article ID 626254, 26 pages.

9. J. Heittokangas. On interpolating Blaschke products and Blaschke-oscillatory equations. Constructive Approximation  34 (2011), n. 1, 1-21.

D. Girela, J. A. Peláez, F. Pérez González and J. Rättyä. Carleson measures for the Bloch space. Integral Equations and Operator Theory 61 (2008), n. 4, 511-547.

Cited in:

1. Xiaohong Fu and Xiangling Zhu. Weighted composition operators on some weighted spaces in the unit ball. Abstract and Applied Analysis, Vol. 2008, Article ID 605807, 8 pages, 2008. doi:10.1155/2008/605807

2. E. S. Doubtsov. Bloch-Carleson measures and Aleksandrov-Ryll-Wojtaszczyk polynomials.(In Russian). Steklov Institute of Mathematics at St. Petersburg, preprint 14/2008.

3. E. S. Doubtsov. Weighted composition operators on growth spaces. Siberian Math. J. 50, n. 6, (2009), 998-1006.

4. Dinggui Gu. Extended Cesàro operators from logarithmic-type spaces to Bloch-type spaces.  Abstract and Applied Analysis 2009. Art. I. D. 246521, 9 pp.

5. E. Doubtsov. Growth spaces on circular domains: composition operators and Carleson mesaures.  Comp. Rendus Math. 347 (2009), n. 11-12, 609-612.

6. E. Doubtsov. Carleson-Sobolev measures for weighted Bloch spaces. J. Functional Analysis 258 (2010), n. 8, 2801-2816.

7. Sei-Ichiro Ueki. Order bounded weighted composition operators mapping into the Bergman space. Complex Analysis and Operator Theory  6, n. 3 (2012), 549-560.

8. E. Abakumov and E. Doubtsov. Reverse estimates in growth spaces. Math. Z.  271, 1-2 (2012), 399-413.

9. Yuan Cheng, Sanjay Kumar and Ze-Hua Zhou. Weighted composition operators on Dirichlet-type spaces and related $Q_q$ spaces. Publ. Math. Debrecen 80/1-2 (2012), 79-88.

10. J. M. Cohen, F. Colonna and D. Singman. Carleson measures on a homogeneous tree.  J. Math. Anal. Appl.  395, 1 (2012), 403-412.

11. Hui-qi Liu, Shan-li Ye, and Qing-xiao Hu. Carleson measure and Berezin transform. J. of Minjiang University  32, 5 (2012), 8-11.

12. J. Heittokangas. A survey on Blaschke-oscillatory differential equations, with updates.  In "Blaschke products and their applications". Fields Institute Communications, Vol 65 (2013), 43-98.

13. J. Gröhn, J. A. Peláez and J. Rättyä. Jointly maximal products in weighted growth spaces. To appear in Ann. Acad. Sci. Fenn.

D. Girela and M. A. Márquez. Superposition operators between Qp spaces and Hardy spaces.  J. Math. Anal. Appl. 364 n. 2 (2010), 463-472.

Cited in:

1. J. C. Ramos Fernández. Bounded superposition operators between weighted Banach spaces of analytic functions. Applied Math. and Computation 219, n. 10, (2013), 4942-4949.

2. J. Bonet and D. Vukotic. Superposition operators between weighted Banach spaces of analytic functions. Monatshefte Math.  170, 3-4, (2013), 311-323.

3. A.El-Sayed Ahmed and S. Omran. Weightes superposition operators in some analytic functions spaces. J. Comput. Anal. Appl. 15 (2013), 6, 996-1005.

P. Galanopoulos, D. Girela and J. A. Peláez. Multipliers and integration operators on Dirichlet spaces. Trans. Amer. Math. Soc. 363 (2011), n. 4,  1855-1886.

Cited in:

1. J. Pau and J. A. Peláez.  Embedding theorems and integration operators on Bergman spaces with rapidly decreasing weights. J. Functional Analysis 259 (2010), n. 10, 2727-2756.

2. O. Constantin. A Volterra-type integration operator on Fock spaces. Proc. Amer. Math. Soc.  140 (2012), 4247-4257.

3. P. Galanopoulos, D. Girela and M. J. Martín. Besov spaces, multipliers, and univalent functions. Complex Analysis and Operator Theory 7 (2013), n. 4, 1081-116.

4. Ch. Chatzifountas. Multipliers and integration operators in spaces of analytic functions. Ph. D. Thesis. Universidad de Málaga (2013).

5. M. Ballasote, M. Contreras, C. Hernández Mancera, M. J. Martín, and P. J. Paúl. Volterra operators and semigroups in weighted Banach spaces of analytic functions. To appear in Collect. Math.

6. Ch. Chatzifountas, D. Girela and J. A. Peláez. Multipliers of Dirichlet subspaces of the Bloch spaces. To appear in Journal of Operator Theory.

J. J. Donaire, D. Girela and D. Vukotic. On the growth and range of functions in Möbius invariant spaces. J. d'Analyse Math. 112 (2010), 237-260.

Cited in:

1. D. Girela. Conformal mappings and spaces of analytic functions. Function Spaces and Classes. Joensuu 2006. 9-31. Univ. Joensuu Dept. Math. Rep. Ser., 12,  Univ. Joensuu, Joensuu, 2007.

2. P. Galanopoulos, D. Girela and R. Hernández. Univalent functions, VMOA and related spaces. J. Geometric Analysis 21 (2011), n.3, 665-682.

3. P. Galanopoulos, D. Girela and M. J. Martín. Besov spaces, multipliers, and univalent functions. Complex Analysis and Operator Theory 7 (2013), n. 4, 1081-116.

D. Girela, C. González and M. Jevtic. Inner functions in Lipschitz, Besov, and Sobolev spaces. Abstract and Applied Analysis, vol. 2011, Article ID 626254, 26 pages, 2011.

Cited in:

1. J. A. Cima and A. Nicolau. Inner functions with derivative in the weak Hardy spaces. To appear in Proc. Amer. Math. Soc.

2. J. Gröhn and A. Nicolau. Inner functions in weak Besov spaces. To appear in J. Functional Analysis.

P. Galanopoulos, D. Girela and R. Hernández. Univalent functions, VMOA and related spaces. J. Geometric Analysis 21 (2011), n.3, 665-682.

1. P. Galanopoulos, D. Girela and M. J. Martín. Besov spaces, multipliers, and univalent functions. To appear in Complex Analysis and Operator Theory.

2. F. Pérez González and J. Rättyä. Univalent functions in the Möbius invariant $Q_K$-spces. Abstract and Applied Analysis, Vol 2011 (2011), Article ID 259796, 11 pages.

3. Ch. Chatzifountas. Multipliers and integration operators in spaces of analytic functions. Ph. D. Thesis. Universidad de Málaga (2013).

4. Ch. Chatzifountas, D. Girela and J. A. Peláez. Multipliers of Dirichlet subspaces of the Bloch spaces. To appear in Journal of Operator Theory.

P. Galanopoulos, D. Girela, J. A. Peláez, and A. Siskakis. Generalized Hilbert operators. To appear in Ann. Acad. Sci. Fenn.

1. J. A. Peláez and J. Rättyä. Generalized Hilbert operators on weighted Bergman spaces. Advances in Math. 240 (2013), 227-267.

2. Guanglong Bao and Hasi Wulan. Hankel matrices acting on Dirichlet spaces.  J. Math. Anal. Appl.  409 (2014), 228-235.

3. Ch. Chatzifountas. Multipliers and integration operators in spaces of analytic functions. Ph. D. Thesis. Universidad de Málaga (2013).

4. Ch. Chatzifountas, D. Girela, and J. A. Peláez. A generalized Hilbert matrix acting on Hardy spaces.  To appear in J. Math. Anal. Appl.

Works which cite books edited by Daniel Girela

D. Girela, G. López Acedo and R. Villa Caro (editores):

Seminar of mathematical analysis. Proceedings, Universities of Málaga and Seville (Spain), 

September 2002-February 2003

Secretariado de Publicaciones, Universidad de Sevilla. 276 p. (2003).

Cited in:

1. D. García, M. Maestre, P. Sevilla-Peris. Composition operators between weighted spaces of holomorphic functions on Banach spaces. Ann. Acad. Sci. Fenn. 29 (2004), n. 1, 81-98.

2. Dhompongsa, S.; Kaewkhao, A.; Panyanak, B. Lim's theorems for multivalued mappings in CAT(0) spaces. J. Math. Anal. Appl. 312 (2005), n. 2, 478-487.

3. D. García, M. Maestre, P. Sevilla-Peris. Weakly compact composition operators between weighted spaces. Note di Matematica 25, 1, 2006, 2005-220.

4. U. Kohlenbach. Some computational aspects of metric fixed-point theory.  Nonlinear Analysis 61 (2005), no. 5, 823-837.

5. A. R. Alimov. Monotone path-connectedness of Chebyshev sets in the space C(Q). SB MATH, 2006, 197 (9), 1259-1272.

6. A. R. Alimov. Connectedness of suns in the space $c\sb 0$. Izv. Math. 69 (2005), no. 4, 651—666.

7. U. Kohlenbach. Some logical metatheorems with applications in functional analysis. Trans. Amer. Math. Soc. 357 (2005), no. 1, 89-128.

8. A. R. Alimov. Preservation of approximative properties of subsets of Chebyshev sets and suns in $\ell \infty (N)$. Izv. Math. 70 (2006),  857-866.

9. M. Mackey, P. Sevilla-Peris and J. A. Vallejo. Composition operators on weighted spaces of holomorphic functions on $JB\sp *$-triples. Lett. Math. Phys. 76 (2006), no. 1, 19-26.

10. P. Chaoha and A. Phon-on. A note on fixed point sets in CAT(0) spaces. J. Math. Anal. Appl. 320 (2006), no. 2, 983-987.

11. J. P. Moreno and R. Schneider. Intersection properties of polyhedral norms. Adv. Geom.  7 (2007), no. 3, 391-402.

12. A. Fiorenza and J. M. Rakotoson. Relative rearrangement and Lebesgue spaces $L^{p(.})$ with variable exponent. J. Math. Pures Appl. (9) 88 (2007), n. 6, 506-521.

13. N. Palmberg. Weighted composition operators with closed range. Bull. Australian Math. Soc. 75 (2007), n. 3, 331-354.

14. S. Dhompongsa, W. A. Kirk and B. Panyanak. Nonexpansive set-valued mappings in metric and Banach spaces. J. Nonlinear Convex Anal. 8 (2007), no. 1, 35-45.

15. W. A. Kirk. Some recent results in metric fixed point theory. J. Fixed Point Theory Appl. 2 (2007), n. 2, 195-207.

16. A. Harutyunyan and W. Lusky. On the boundedness of the differentiation operator between weighted spaces of analytic functions. Studia Math. 184 (2008), n. 3, 233-247.

17. W. A. Kirk and B. Panyanak. A concept of convergence in geodesic spaces. Nonlinear Analysis 68 (2008), no. 12, 3689-3696.

18. N. Shahzad and J. Markin. Invariant approximations for commuting mappings in $\rm CAT(0)$ and hyperconvex spaces. J. Math. Anal. Appl. 337 (2008), n. 2, 1457-1464.

19. U. Kohlenbach. Applied proof theory: proof interpretations and their use in mathematics. Springer Monographs in Mathematics. Springer-Verlag, Berlin, 2008. xx+532 pp. ISBN: 978-3-540-77532-4.

20. S. Dhompongsa and B. Panyanak. On -convergence theorems in CAT(0) spaces. Computers & Mathematics with Applications 56 (2008),  n. 10, 2572-2579.

21. R. Espínola and A. Fernández León. CAT(k)-spaces, weak convergence and fixed points. To appear in J. Math. Anal. Appl.

22. J. Bonet and J. Taskinen. Toeplitz operators on the space of analytic functions with logarithmic growth. J. Math. Anal. Appl.  353 (2009), n. 1, 428-435.

23. N. Shahzad. Fixed point results for multimaps in CAT(0) spaces. Topology and its Applications. 156 (2009), n. 5, 997-1001.

24. S. Dhompongsa, W. Fupinwong and  A.  Kaewkhao. Common fixed points of a nonexpansive semigroup and a convergence theorem for Mann iterations in geodesic metric spaces. Nonlinear Analysis: Theory, Methods & Applications 70 (2009), n. 12, 4268-4273.

25. J. Bonet and W. J. Ricker. Mean ergodicity of multiplication operators in weighted spaces of analytic functions.  Archiv der Math. 92 (2009), 428-437.

26. D. Carando and  P. Sevilla-Peris. Spectra of weighted algebras of holomorphic functions.  Math. Z. 263 (2009), n.4, 887-902.

27. N. Shahzad.  Invariant approximation in CAT(0) spaces. Nonlinear Analysis 70 (2009), n. 12, 4338-4340.

28. Chong Li, G. López and V. Martín-Vázquez. Iterative algorithms for nonexpansive mappings on Hadamard manifolds.  Taiwanese J. Math. 14 (2010), no. 2, 541–559.

29. J. S. Manhas. Weighted composition operators between weighted spaces of vector-values holomorphic functions on Banach spaces.  To appear in Appl. Math. and Computation.

30. R. Espínola and B. Piatek. The fixed point property and unbounded set in CAT(0) spaces. J. Math. Anal. Appl. 408 (2013), 638-654.

D. Girela, G. López Acedo and R. Villa Caro (editores):

Seminar of mathematical analysis.  Proceedings, Universities of Málaga and Seville (Spain), 

September 2003- June 2004

Secretariado de Publicaciones, Universidad de Sevilla. 316 p. (2004).

Cited in:

1. Archil Gulisashvili and J. A. Van Casteren. Non-autonomous Kato classes and Feinman-Kac propagators. World Scientific Publishing Co. Pte. Ltd., Hackensack, NJ, 2006.

2. D. Cruz Uribe, J. M. Martell and C. Pérez. Extensions of Rubio de Francia's extrapolation theorem. Collect. Math. 2006, Vol. Extra. 190-231.

3. G. Averkov and N. Düvelmeyer. Embedding metric spaces into normed spaces and estimates of metric capacity. Monatshefte für Mathematik 152, 3 (2007), 197-206.

4. G. V. Welland. Short review of the work of Professor J. Marshall Ash. In:  Topics in harmonic analysis and ergodic theory. (J. M. Rosenblatt, A. M. Stokolos and Ahmed I. Zayed, editors). Contemporary Mathematics, Vol. 444, (2007), 115-128.

5. K.  J. Swanepoel and R. Villa. A lower bound for the equilateral number of normed spaces. Proc. Amer. Math. Soc. 136 (2008), 127-131.

6. Archil Gulisashvili. Classes of time-dependent measures, non-homogeneous Markov processes, and Feynman-Kac propagators. Trans. Amer. Math. Soc. 360 (2008), n. 8, 4063-4098.

7. Guoen Hu, Dachun Ynag and Dongyong Yang. A new characterization of RBMO(\mu ) by John-Strömberg sharp maximal functions. Czechoslovak Math. J. 59 (134) (2009), 159-171.

8. M. Naszodi and S. Taschuk. On the transversal number and VC-dimension of families of positive homothets of a convex body.  Discrete Math. 310 (2010), no. 1, 77–82.

9. H. Martini, M. Spirova and K.  J. Swanepoel. Geometry where direction matters- or does it?  The mathematical intelligencer, 33 (3). pp. 115-125.

D. Girela, G. López Acedo and R. Villa Caro (editores):

Seminar of mathematical analysis.  Proceedings, Universities of Málaga and Seville (Spain), 

September 2004-June 2005

Secretariado de Publicaciones, Universidad de Sevilla. 239 pp. (2006).

Cited in:

1. P. N. Dowling,  B. Randrianantoanina and B. Turett. The fixed point property via dual space properties. J. Func. Analysis  255 (2008), n. 3, 768-775.

2. Z. Yang. Existence and uniqueness of positive solutions for an integral boundary value problem. Nonlinear Anal. 69 (2008), no. 11, 3910-3918.

3. G. Infante and P. Pietramala. Existence and multiplicity of non-negative solutions for systems of perturbed Hammerstein integral equations.  Nonlinear Anal. 71 (2009), no. 3-4, 1301–1310.

4. G. Infante. Positive solutions of nonlocal boundary value problems with singularities. Discrete Contin. Dyn. Syst. 2009, Dynamical Systems, Differential Equations and Applications. 7th AIMS Conference, suppl., 377–384.

D. Girela and C. González (Editores)

Topics in Complex Analysis and operator Theory.

Servicio de Publicaciones, Universidad de Málaga. 2007.

Cited in:

1. F. Bracci, M. Contreras and S. Díaz Madrigal. Aleksandrov-Clark measures and semigroups of analytic functions in the unit disc, Ann. Acad. Sci. Fenn., Math. 33, 1 (2008), 231-240.

2. P. Nieminen. Composition operators, Aleksandrov measures and value distribution of analytic maps in the unit disc. Doctoral dissertation. University of Helsinki, 2007.

3. G. Costakis and A. Manoussos. J-class wieghted shifts on the space of bounded sequences of complex numbers. Integral Equations and Operator Theory 62 (2008), n. 2, 149-158.

4. G. Costakis, D. Hadjilouloukas and A. Manoussos. Dynamics of tuples of matrices. Proc. Amer. Math. Soc. 137 (2009), n. 3, 1025-1034.

5. E. Gallardo, M. J. González, P. Nieminen and E. Saksman. On the connected component of compact composition operators on the Hardy space. Advances in Math. 219 (2008), n. 3, 986-1001.

6. E. S. Doubtsov. Weighted composition operators on growth spaces. Siberian Math. J. 50, n. 6, (2009), 998-1006.

7. S. Elliot. Adjoints of composition operators on Hardy spaces of the half plane. J. Functional Analysis 256 (2009), n. 12, 4162-4186.

8. G. Costakis and A. Manoussos. J-class operators and hypercyclicity. Preprint. 2009: arxiv.org/abs/0704.3354.

9. N. Arcozzi, R. Rochberg, E. Sawyer and B. D. Wick. Function spaces related to the Dirichlet space. To appear in J. London Math. Soc.

10. P. Galanopoulos, D. Girela and J. A. Peláez. Multipliers and integration operators on Dirichlet spces. To appear in Trans. Amer. Math. Soc.

11. S. Elliot. A matrix-valued Aleksandrov disintegration theorem. Complex Anal. Oper. Theory  4 (2010), no. 2, 145–157

12. A. Aleman and O. Constantin. Spectra of integration operators on weighted Bergman spaces. J. d'Analyse Math. 109, 1 (2009), 199-231.

13. A. Aleman and A. M. Persson. Resolvent estimates and decomposable extensions of generalized Cesàro operators. J. Func. Analysis 258, 1 (2010), 67-98.

14. J. Pau and J. A. Peláez.  Embedding theorems and integration operators on Bergman spaces with rapidly decreasing weights. J. Functional Analysis 259 (2010), n. 10, 2727-2756.

15. F. Bayart, G. Costakis and D. Hadjilouloukas. Topologically transitive skew-products of operators. Ergodic Theory Dynam. Systems 30 (2010), no. 1, 33–49.

16. P. Nieminen. Essential norms of weighted composition operators and Aleksandrov measures. J. Math. Anal. Appl.  382 (2011), 565-576.

17. E. Abakumov and E. Doubtsov. Reverse estimates in growth spaces. To appear in Math. Z.

18. L. Bernal, M. C. Calderón and J. A. Prado. Large subspaces of compositionally universal functions with maximal cluster sets. To appear in J. Approx. Th.

19. J. Pau and J.A. Peláez. Volterra type operators on Bergman spaces with exponential weights. To appear in Contemporary Mathematics.

20. J. Pau and J. A. Peláez. Schatten classes on integration operators on Dirichlet spaces. To appear in J. Anal. Math.

21. O. Constantin. A Volterra-type integration operator on Fock spaces. Proc. Amer. Math. Soc.  140 (2012), 4247-4257.