1

Publications of Miroslav Pavlovic

1. Introduction to Function Spaces on the Disk, Matematicki institut u Beogradu, 2004.cited {29} times in [13] [77] [80] [265] [274] [294] [295] [310] [314] [324] [325] [328] [335] [364] [370] [414] [403] [460][461] [462] [84] [423] [19] [86] [359] [83] [471] [407] [448]

2. Poluskalarni proizvod u normiranim prostorima [Semi-inner product in normed spaces], Magistarski rad, PMFBeograd, 1978.{1} [140]

3. Geometrija kompleksnih Banahovih prostora [Geometry of complex Banach spaces], Beograd 1983.

Unpublished

4. On the infinitesimal δ-inequality, 1996.{3} [202] [157] [52]

Papers

5. Odna teorema o metrizacii lokal~no vypuklogo prostranstva, Mat. Vesnik 3(1979), 327–330.

6. Dve trehmernye harakterizacii skal�rnogo proizvedeni�, Mat. Vesnik 3(1979), 493–495.

7. Nekotorye neravenstva v prostranstvah Lp, Mat. Vesnik 6(1982), 67–73.

8. Moduli c-vypuklosti normirovannyh prostranstv. I, Prostranstva Lp, Mat. Vesnik 6(1982), 139–151.

9. Moduli c-vypuklosti normirovannyh prostranstv. II, Prostranstva Orliqa, Mat. Vesnik 6(1982), 307–314.

10. On the integral means of derivatives of the atomic function, Proc. Amer. Math. Soc. 87(1982), 309–316. (with M.Mateljevic){9} [22] [91] [103] [164] [175] [246] [271] [383] [409]

11. An extension of the Hardy-Littlewood inequality, Mat. Vesnik 6(1982), 55–61. (with M. Mateljevic){2} [1] [77]

12. Lp behavior of power series with positive coefficients and Hardy spaces, Proc. Amer. Math. Soc. 87(1983), 309–316.(with M. Mateljevic){94} [1] [2] [7] [8] [23] [25] [29] [30] [18] [31] [135] [34] [35] [65] [67] [68] [70] [71] [73] [79] [80] [87] [88] [89] [90] [92] [97][99] [102] [107] [110] [111] [112] [113] [115] [116] [117] [118] [119] [120] [123] [124] [128] [132] [136] [138] [144] [153] [158][159] [160] [162] [167] [170] [171] [178] [188] [194] [196] [198] [204] [212] [215] [220] [225] [227] [230] [240] [241] [261] [264][275] [284] [289] [301] [302] [304] [307] [312] [317] [320] [322] [334] [336] [355] [378] [388] [392] [395] [82] [457] [413] [464][435]

13. Lp-behavior of the integral means of analytic functions, Studia Math. 77(1984), 219–237. (with M. Mateljevic){29} [1] [4] [9] [25] [32] [43] [50] [68] [74] [76] [90] [96] [124] [139] [148] [172] [173] [185] [187] [211] [233] [245] [266] [267][309] [320] [346] [82] [457]

14. New proofs of the isoperimetric inequality and some generalizations, J. Math. Anal. Appl. 98(1984), 25–30. (with M.Mateljevic){9} [3] [94] [224] [389] [393] [402] [460] [84] [83]

15. Lp behavior of power series with positive coefficients and some spaces of analytic functions, Proc. International Conf.on Constructive Theory of Functions 84 (Sofia 1984, 600–604). (with. M. Mateljevic)

16. Duality and multipliers of Lipschitz spaces, Proc. Inter. Conf. Complex Anal. Appl. 83 (Sofia 1985, 153–160). (withM. Mateljevic){3} [68] [93] [98]

17. On Hardy-Lipschitz spaces, Mat. Vesnik 37(1985), 81–84. (with M. Mateljevic){1} [2]

18. Some inequalities of isoperimetric type for the integral means of analytic functions, Mat. Vesnik 37(1985), 78–80. (withM. Mateljevic){2} [95] [84]

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19. Nekotorye neravenstva v prostranstvah Lp. II, Mat. Vesnik 10(1986), 321–326.

20. Mixed norm spaces of analytic and harmonic functions. I, Publ. Inst. Math. (Beograd) 40(1986), 117–141.{2} [68] [320]

21. Mixed norm spaces of analytic and harmonic functions. II, Publ. Inst. Math. (Beograd) 41(1987), 97–110.{5} [320] [32] [68] [172] [173]

22. Uniform c–convexity of Lp, 0 < p < 1, Publ. Inst. Math. (Beograd) 43(1988), 117–124.

23. Mean values of harmonic conjugates in the unit disc, Compl. Var. Th. Appl. 10(1988), 53–65.{7} [26] [101] [109] [114] [295] [379] [367]

24. An inequality for the integral means of a Hadamard product, Proc. Amer. Math. Soc. 103(1988), 404–406.{4} [100] [125] [175] [273]

25. Lipschitz spaces and spaces of harmonic functions in the unit disc, Michigan Math. J. 35(1988), 301–311.{1} [440]

26. Convolution in the harmonic Hardy class hp with 0 < p < 1, Proc. Amer. Math. Soc. 109(1990), 129–134.{4} [453] [434] [425] [445]

27. Multipliers of Hp and BMOA, Pacific J. Math. 146(1990), 71-84. (with M. Mateljevic){56} [10] [24] [27] [28] [32] [41] [68] [104] [106] [116] [122] [124] [125] [127] [131] [133] [141] [143] [145] [146] [155] [163][166] [168] [172] [173] [177] [179] [182] [184] [189] [190] [195] [199] [206] [217] [219] [221] [222] [244] [250] [256] [273] [296][318] [320] [353] [333] [368] [385] [384] [406] [62] [86] [11] [416]

28. On the complex uniform convexity of quasi-normed spaces, Math. Balk. (N.S.) 5(1991), 92–98.{4} [161] [192] [237] [281]

29. On multipliers from Hp to `q (0 < q < p < 1), Arch. Math. 56(1991), 174–180. (with M. Jevtic){10+1} [68] [77] [104] [121] [124] [149] [172] [244] [320] [370]+[110]

30. The Hahn–Banach extension property in Hardy and mixed norm spaces on the unit ball, Monatsh. Math. 111(1991),137–145. (with M. Jevtic)

31. Inequalities for the gradient of eigenfunctions of the invariant Laplacian on the unit ball, Indag. Math. (N.S.) 2(1991),89–98.{36} [6] [12] [15] [45] [48] [72] [108] [126] [129] [137] [142] [147] [152] [165] [176] [180] [183] [186] [193] [197] [201] [205][208] [218] [242] [243] [251] [258] [274] [295] [313] [338] [424] [459] [86] [21]

32. On isomorphisms of L1 spaces of analytic functions onto `1, Publ. Inst. Math. (Beograd) 50(1991), 101–104.

33. Some inequalities of isoperimetric type concerning analytic and subharmonic functions, Publ. Inst. Math. (Beograd)50(1991), 123–160. (with M. Mateljevic){4} [402] [460] [84] [448]

34. On the moduli of continuity of Hp functions with 0 < p < 1, Proc. Edinb. Math. Soc. 35(1992), 89–100.{2} [428] [440]

35. On the Banach envelope of Hardy-Orlicz spaces, Funct. Approx. Comment. Math. 20(1992), 9–19.

36. Inequalities for a regular polygon in Lp spaces, Mat. Vesnik 44(1992), 89–95.

37. Multipliers of the vanishing Hardy classes, Publ. Inst. Math. (Beograd) 52(1992), 34–36.{3} [453] [434] [445]

38. A remark on BMO and Bloch functions in the unit ball in Rn, Tokyo J. Math. 16(1993), 291–294.{2} [130] [181]

39. On M -Bloch functions, Publ. Inst. Math. (Beograd) 53(1993), 61–68. (with M. Jevtic){+1} +[105]

40. M -Besov p-classes and Hankel operators in the Bergman spaces on the unit ball, Arch. Math. 61(1993), 367–376.(with M. Jevtic){5+1} [5] [201] [274] [295] [86]+[142]

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41. An inequality related to the uniform convexity in Banach spaces, Mat. Vesnik 45(1993), 29–33.

42. An extension of the Forelli–Rudin projection theorem, Proc. Edinb. Math. Soc. 36(1993), 375–389. (with M.Mateljevic){4} [150] [156] [210] [450]

43. On subharmonic behavior and oscillation of functions on balls in Rn, Publ. Inst. Math. (Beograd) 55(1994), 18–22.{31} [37] [38] [45] [47] [49] [56] [57] [130] [181] [191] [197] [207] [209] [229] [258] [262] [274] [291] [295] [321] [354] [357][364] [379] [397] [367] [408] [436] [86] [468] [21]

44. Integral means of the Poisson integral of a discrete measure, J. Math. Anal. Appl. 184(1994), 229–242.{2} [80] [316]

45. The best approximation and composition of with inner functions, Mich. Math. J. 42(1995), 367–378. (with M.Mateljevic){1} [282]

46. On M -harmonic Bloch space, Proc. Amer. Math. Soc. 123(1995), 1385–1392. (with M. Jevtic){10+5} [151] [154] [169] [174] [201] [249] [232] [33] [290] [440]+[134] +[126] +[142] +[152] +[180]

47. A remark on the partial sums in Hardy spaces, Publ. Inst. Math. (Beograd) 58(1996), 149–152.

48. A proof of the Hardy-Littlewood theorem on fractional integration and a generalization, Publ. Inst. Math. (Beograd)59(1996), 31–38.{3} [80] [295] [316]

49. An Lp inequality in Lq (p, q > 0), J. Math. Anal. Appl. 202(1996), 160–168.{2} [269] [46]

50. Subharmonic behavior of smooth functions, Mat. Vesnik 48(1996), 15–21.{12} [229] [37] [258] [45] [274] [295] [357] [364] [375] [367] [86] [209]

51. On Cesaro means in Hardy spaces, Publ. Inst. Math. (Beograd) 60(1996), 81–87.

52. On the convolution of harmonic functions and harmonic polynomials, Filomat(Nis) 10(1996), 129–137.

53. Decompositions of Lp and Hardy spaces of polyharmonic functions, J. Math. Anal. Appl. 216(1997), 499–509.{21} [80] [203] [223] [239] [249] [263] [266] [268] [274] [280] [288] [295] [306] [341] [348] [352] [392] [459] [442] [86] [441]

54. Lp integrability of the gradient of a polyharmonic function in the unit disc, Filomat (Nis) 11(1997), 55–60.{1} [252]

55. Coefficient multipliers on spaces of analytic functions, Acta Sci. Math. (Szeged) 64(1998), 531–545. (with M. Jevtic){21} [9] [43] [68] [69] [77] [199] [200] [206] [211] [214] [216] [221] [222] [231] [233] [245] [250] [273] [320] [82] [416]

56. On the inclusion H2(Un) into H2n(Bn) and the isoperimetric inequality, J. Math. Anal. Appl. 226(1998), 143–149.(with M. Dostanic){6} [371] [402] [390] [460] [84] [83]

57. Littlewood-Paley type inequalities for M-harmonic functions, Publ. Inst. Math. (Beograd) 64(78)(1998), 36–52. (withM. Jevtic){4} [80] [276] [303] [424]

58. On a sharp inequality for the Laplacian of a polyharmonic functions, Publ. Math. (Debrecen) 54(1999), 263–266.

59. On harmonic conjugates with exponential mean growth, Czech. Math. J. 49(1999), 733–742.{4} [80] [356] [376] [19]

60. On Dyakonov’s paper ‘Equivalent norms on Lipschitz–type spaces of holomorphic functions’, Acta M. (Djursholm)183(1999), 141–143.{21} [39] [42] [53] [226] [228] [235] [236] [248] [255] [257] [265] [283] [299] [314] [323] [369] [60] [410] [454] [444] [471]

61. Subharmonic behavior of generalized (α, β)– harmonic functions and their derivatives, Indian J. Pure Appl. Math.30(1999), 407–418. (with M. Jevtic){3+1} [274] [295] [86]+[152]

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62. Harmonic Bergman functions on the unit ball in Rn, Acta Math. Hung. 85(1999), 81–96. (with M. Jevtic){18} [51] [66] [78] [80] [213] [311] [340] [341] [348] [366] [381] [401] [397] [415] [434] [453] [441] [445]

63. A Littlewood–Paley theorem for subharmonic functions, Publ. Inst. Math. (Beograd) 68(82)(2000), 77–82.{6} [80] [205] [274] [276] [86] [21]

64. Series expansion and reproducing kernels for hyperharmonic functions, J. Math. Anal. Appl. 264(2001), 673–681.(with M. Jevtic){1} [254]

65. Harmonic Besov spaces on the unit ball of Rn, Rocky Mount. J. Math. 31 (2001), 1305–1316. (with M. Jevtic){2} [344] [453]

2002–2005

66. Boundary correspondence under harmonic quasiconformal homeomorphisms of the unit disk, Ann. Acad. Sci. Fenn.27(2002), 365–372.{50} [17] [58] [59] [247] [253] [270] [277] [293] [298] [305] [308] [326] [327] [343] [350] [358] [365] [372] [373] [374] [375][377] [391] [396] [399] [430] [411] [398] [458] [382] [417] [422] [400] [438] [439] [465] [466] [407] [456] [437] [467] [455] [412][40] [360] [431] [433] [452] [469] [449]

2003

67. Complex convexity and Littlewood–Paley vector-valued inequalities, Bull. Lond. Math. Soc. 35(2003),749–758. (withO. Blasco){5+1} [238] [292] [287] [337] [80] +[234]

68. A note on hyperharmonic and polyharmonic functions, J. Math. Anal. Appl. 296(2004), 276–285. (with M. Jevtic)

69. Hadamard product in Qp spaces, J. Math. Anal. Appl. 305(2005), 589–598.{6} [13] [296] [363] [368] [385] [333]

70. Boundary correspondence under quasiconformal harmonic diffeomorphisms of a half-plane, Ann. Acad. Sci. Fenn.30(2005), 159–165. (with D. Kalaj){16+22} [16] [58] [260] [270] [278] [300] [319] [343] [372] [373] [375] [399] [458] [382] [427] [465] +[277] +[327] +[308]+[298] +[350] +[377] +[358] +[374] +[59] +[391] +[396] +[411] +[417] +[422] +[430] +[438] +[439] +[467] +[433]+[452] +[469] +[407]

2006–2010

71. The weak Chang-Marshall inequality via Green’ formula, Rocky Mount. J. Math. 36:5(2006), 1631–1636. (with D.Vukotic){1+1} [13]+[36]

72. Splitting isoperimetric inequality through preduality of Qp, 0 < p < 1, J. Funct. Anal. 233(2006), 40–59. (with JieXiao){4+1} [44] [285] [286] [394] +[13]

73. On the solid hull of Hp, 0 < p < 1, Mich. Math. J. 54(2006), 439–436. (with M. Jevtic){2} [77] [370]

74. A short proof of an inequality of Littlewood and Paley, Proc. Amer. Math. Soc. 134(2006), 3625–3627.{7} [48] [80] [274] [345] [424] [86] [21]

75. Spaces of analytic functions of Hardy-Bloch type, J. Anal. Math. 100(2006), 53–83. (with D. Girela, and J. A. Pelaez){12+6} [80] [279] [294] [317] [339] [378] [426] [353] [419] [420] [81] [429] +[271] +[14] +[297] +[330] +[395] +[409]

76. Weighted integrals of higher order derivatives of an analytic function, Acta. Sci. Math. (Szeged) 72(2006), 73–93.(with J. A. Pelaez){1} [54]

77. Remarks on Lp-oscillation of the modulus of an analytic function, J. Math. Anal. Appl. 326(2007), 1–11.{3} [272] [347] [399]

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78. Equivalent norms on Dirichlet spaces of polyharmonic functions on thee unit ball in Rn, Bol. Soc. Mat. Mexicana, 3a.Serie, Vol. 13:2(2007), 307–319. (with Olivera Djordjevic){3} [80] [348] [64]

79. Lp-integrability of the maximal function of a polyharmonic function, J. Math. Anal. Appl. 336(2007), 411–417. (withO. Djordjevic){5} [56] [321] [364] [379] [468]

80. Littlewood-Paley inequalities in uniformly convex and uniformly smooth Banach spaces, J. Math. Anal. Appl. 336(2007),31–43. (with Karen Avetisyan and Olivera Djordjevic)+{1} +[80]

81. The Mixed Norm Spaces of Polyharmonic Functions, Potential Anal. 27, No. 2 (2007), 167–182. (with Zhangjian Huand Xuejun Zhang)+{2} +[259] +[392]

82. On a class of linear functionals on the Bergman space over the complement of the unit lattice, Arch. Math. (Basel)89, No. 2. (2007), 167–169.

83. On a Littlewood-Paley type inequality, Proc. Amer. Math. Soc. 135(2007), 3607–3611. (with Olivera Djordjevic){4} [80] [348] [424] [21]

84. An equivalence for weighted integrals of an analytic function and its derivative, Math. Nachr. 11(2008),1612–1623.(with J. A. Pelaez){5+7} [80] [299] [349] [419] [470] +[297] +[330] +[55] +[376] +[432] +[63] +[19]

85. Derivative-free characterizations of bounded composition operators between Lipschitz spaces, Math. Zeit. 258(2008),81–86.{1} [369]

86. Lipschitz conditions for the norm of a vector valued analytic function, Houston J. Math. 34(3)(2008), 817–826. (withOlivera Djordjevic)

87. An inequality related to the Gehring-Hallenbeck theorem on radial limits of functions in the harmonic Bergman spaces,Glasgow Math. J. 50(2008), No. 3, 433–435.{4} [354] [357] [379] [367]

88. New characterizations of Bergman spaces, Ann. Acad. Sci. Fenn. 33(2008), 87–99. (with Kehe Zhu){5+1} [80] [315] [351] [380] [386] +[15]

89. Division by inner function in a class of composition operators on Lipschitz spaces, Bull. London Math. Soc. 40, Part2 (2008), 195–205.

90. Subharmonicity of |f |p for quasiregular harmonic functions, and applications, J. Math. Anal. Appl. 342 (2008)742–746. (with Vesna Kojic) {5+5} [60] [410] [444] [471] [418] +[347] +[75] +[58] +[405] +[399]

91. Lischitz conditions on the moduli of harmonic functions, Revista Mat. Iber. 23(2007), no. 3, 831-845.{6} [323] [347] [399] [454] [85] [471]

92. On the Holland-Walsh characterization of Bloch functions, Proc. Edinb. Math. Soc. 51(2008), 439–441.{3} [342] [463] [447]

93. Classes of quasi-nearly subharmonic functions, Potential Anal. 29:1(2008), 89–104. (with Juhani Riihentaus){2+16} [295] [436] +[45] +[258] +[262] +[291] +[47] +[57] +[321] +[49] +[56] +[357] +[354] +[364] +[379] +[367]+[408] +[468]

94. A formula for the Bloch norm of a C1-function on the unit ball of Cn, Czech. Math. J. 8(133)(2008), 1039–1043.{1} [463]

95. On the solid hull of the Hardy-Lorentz space, Publ. Inst. Math. (Beograd) 85(99)(2009), 55–61. (with M. Jevtic){2} [77] [370]

96. A note on the diagonal mapping in spaces of analytic functions in the unit polydisc, Publ. Math. (Debrecen), 74(1-2)(2009), 45–58. (with M. Jevtic and R. F. Shamoyan){+11} +[318] +[329] +[331] +[332] +[384] +[371] +[361] +[390] +[362] +[415] +[421]

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97. Addendum to “New characterizations of Bergman spaces”, Ann. Acad. Sci. Fenn. 34(2009), 315–317. (with K. Zhu){1+1} [351] +[15]

98. Green’s formula and the Hardy-Stein identities, Filomat (Nis) 23:3 (2009), 135–153.{3} [429] [451] [418]

99. Hardy-Stein type characterization of harmonic Bergman spaces, Potential Anal. 32, No. 1 (2010), 1–15.{2} [397] [418]

100. On the Libera operator, J. Math. Anal. Appl. 370:2 (2010), 588–599. (with Maria Nowak)

101. Lacunary series in mixed norm spaces on the ball and the polydisk, Filomat (Nis) 24:2 (2010), 101–110. (with M.Jevtic)

2011–

102. A Schwarz lemma for the modulus of a vector-valued analytic function, Proc. Amer. Math. Soc. 139 (2011), 969-973.{3} [414] [60] [471]

103. Remarks on the area theorem in the theory of univalent functions, Proc. Amer. Math. Soc. 139 (2011), 909-916. (withJ. A. Pelaez)

104. Coefficient multipliers on Banach spaces of analytic functions, Revista Mat. Iber. 27(2011), no. 2, 415–447. (withOscar Blasco){1} [416]

105. Quasi-nearly subharmonic functions on locally uniformly homogeneous spaces, Positivity 15(2011), 1-10. (with J.Riihentaus){+1} +[367]

106. On the quasiconformal self-mappings of the unit disk satisfying the Poisson’s equation, Trans. Amer. Math. Soc. 363(2011) 4043–4061. (with D. Kalaj){1 +16} [61] +[377] +[59] +[391] +[404] +[396] +[417] +[422] +[430] +[439] +[456] +[443] +[467] +[455] +[469]+[407]+[472]

107. BiBloch functions and composition operators from Bloch type spaces to BMOA, J. Math. Anal. Appl. 382(2011),303–313. (with E.G. Kwon){2} [446] [387]

108. Characterizations of the harmonic Hardy space h1 on the real ball, Filomat 25 (2011), no. 3, 137–143.

109. Lacunary series in weighted spaces of analytic functions, Arch. Math. 97 (2011), no. 5, 467–473.{3} [446] [387] [20]

110. Hilbert matrix operator on spaces of analytic functions, Ann. Acad. Sci. Fenn. 37 (2012), 161–174. (with BartoszÃLanucha and Maria Nowak)

To appear

111. Analytic functions with decreasing coefficients and Hardy spaces, Proc. Edinb. Math. Soc. http://dx.doi.org/10.1017/S001309151200003X

112. Integrability of vector-valued lacunary series with applications to function spaces, Annali Mat. Pura. Appl.

113. Besov-Lipschitz and mean Besov-Lipschitz spaces of holomorphic functions on the unit ball, Potential Anal. (with M.Jevtic)

114. On the Littlewood-Paley g-function and Calderon’s area function, Expos. Math.

Preprints

115. Definition and properties of the Libera operator on mixed norm spaces

116. Logathmic Bloch space and its predual

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Where M. Pavlovic is cited:(∗)

Books (31)

1. ? ? ? [12] [13] [11] S. V. Shvedenko, Hardy classes and related spaces of analytic functions in a unit disk, polydisk, andball, in: Itogi Nauki i Tekhniki [Progress in Science and Technology]: Mat. Analiz [in Russian], vol. 23, Moscow, 1985,pp. 3123. (Translated in Journal of Soviet Mathematics, 39(6)(1987), 3011–3087.)

2. ? ? [12] [17] Ashot E. Djrbashian, Faizo A. Shamoian, Topics in the theory of Apα spaces. With German, French

and Russian summaries. Teubner-Texte zur Mathematik [Teubner Texts in Mathematics], 105. BSB B. G. TeubnerVerlagsgesellschaft, Leipzig, 1988.

3. ? [14] R. P. Boas, Invitation to Complex Analysis, The House/Birkhauser Mathematics Series, New York, 1987.

4. ? [13] P. Wojtaszczyk, Banach spaces for analysts, Cambridge Studies in Advanced Mathematics, vol. 25, CambridgeUniversity Press, Cambridge, 1991.

5. ? [40] Kyong Taik Hahn, Bloch-Besov spaces and the boundary behavior of their functions, Lecture Notes Series, Seoul.21. Seoul: Seoul National University, 102 p. (1994).

6. ? [31] M. Stoll, Invariant potential theory in the unit ball of Cn, London Mathematical Society Lecture Note Series,vol. 199, Cambridge University Press, Cambridge, 1994.

7. ? [12] K. G. Grosse-Erdmann, The Blocking Technique, Weighted Mean Operators and Hardy’s Inequality, LectureNotes in Mathematics 1679, 1998.

8. ? [12] Jie Xiao, Holomorphic Q classes, Lecture Notes in Mathematics, vol. 1767, Springer-Verlag, Berlin, 2001.

9. ? ? [13] [55] P. Wojtaszczyk, Spaces of analytic functions with integral norm, Handbook of the geometry of Banachspaces, Vol. 2, North-Holland, Amsterdam, 2003, pp. 1671–1702.

10. ? [27] Peter Duren, Harmonic mappings in the plane, Cambridge Tracts in Mathematics, vol. 156, Cambridge UniversityPress, Cambridge, 2004.

11. ? [27] Girela, D. Analytic functions of bounded mean oscillation, Complex Function Spaces, Univ. Joensuu Dept.Math. Rep. Ser., vol. 4 (2001) 61–170

12. ? [31] Kehe Zhu, Spaces of holomorphic functions in the unit ball, Graduate Texts in Mathematics, vol. 226, Springer-Verlag, New York, 2005.

13. ? ? ? ? [69] [71] [1] [72] J. Xiao, Geometric Qp functions, Frontiers in Mathematics, Birkhauser Verlag, Basel – Boston– Berlin, 2006.

14. ? [75] 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.

15. ? ? ? [31] [88] [97] Ruhan Zhao and Kehe Zhu, Theory of Bergman spaces in the unit ball of Cn, Memories Mem. Soc.Math. France 115(2008), 103 pages.

16. ? [70] Olli Martio, Harmonic mappings in the plane (Cambridge Tracts in Mathematics 156) By Peter Duren: 212 pp.(Cambridge University Press, Cambridge, 2004) Bull. Lond. Math. Soc. 39(2007), 700–702.

17. ? [66] K. Astala, T. Iwaniec, and G. Martin, Elliptic partial differential equations and quasiconformal mappings in theplane, Princeton Mathematical Series 48. Princeton, NJ: Princeton University Press. xvi, 677 p. (2009).

18. ? [12] Laszlo Leindler, Hardy-Littlewood-type inequalities and their factorized enhancement, Survey on classical inequal-ities, Math. Appl., vol. 517, Kluwer Acad. Publ., Dordrecht, 2000, pp. 99–125.

19. ? ? ? [1] [84] [59] J.A. Pelaez and J. Rattya, Weighted Bergman spaces induced by rapidly increasing weights, MemoirsAMS

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8

Proceedings of conferences (69)

21. • • • • • [31] [74] [83] [43] [63] M. Stoll, On the LittlewoodPaley Inequalities for Subharmonic Functions on Domainsin Rn, Recent Advances in Harmonic Analysis and Applications Springer Proceedings in Mathematics and Statistics,2013, Volume 25, Part 2, 357–383.

22. • [10] Miroljub Jevtic, On the integral means of the fractional derivatives of the atomic inner function, Complex analysisand applications ’85 (Varna, 1985), Publ. House Bulgar. Acad. Sci., Sofia, 1986, pp. 290–294.

23. • [12] Hong Oh Kim, Integral means and value distributions, Korea Advanced Institute of Science and Technology, 16p.1989.

24. • [27] Janusz Godula, Integral means of holomorphic functions in the unit ball, (English) ÃLawrynowicz, J. (ed.) et al.,Proceedings of the 4th Finnish-Polish summer school in complex analysis at Jyvaskyla, Finland, August 17-20, 1992.Jyvaskyla: Univ., Mathematisches Institut. Ber., Univ. Jyvaskyla. 55, 19-24 (1993).

25. • • [13] [12] Oscar Blasco, Multipliers on weighted Besov spaces of analytic functions, Banach spaces (Merida, 1992),Contemp. Math., vol. 144, Amer. Math. Soc., Providence, RI, 1993, pp. 23–33.

26. • [23] Jihuai Shi, Some results on singular integrals and function spaces in several complex variables, Several complexvariables in China, 75–101, Contemp. Math. 142, Amer. Math. Soc., Providence, RI, 1993.

27. • [27] Maria Nowak, A note on coefficient multipliers (Hp,B) and (Hp, BMOA), Topics in complex analysis (Warsaw,1992), Banach Center Publ., vol. 31, Polish Acad. Sci., Warsaw, 1995, pp. 299–302.

28. • [27] Oscar Blasco, Convolution by means of bilinear maps, Function spaces (Edwardsville, IL, 1998), Contemp. Math.,vol. 232, Amer. Math. Soc., Providence, RI, 1999, pp. 85–103.

29. • [12] Caiheng Ouyang, Proper inclusions of function spaces and Ryll-Wojtaszczyk polynomials on the unit ball of Cn,409-426 Finite or infinite dimensional complex analysis (Lecture Notes in Pure and Applied Mathematics Series/214)edited by Joji Kajiwara (Kyushu University, Fukuoka, Japan) Zhong Li (Peking University, Beijing, P.R. of China)Kwang Ho Shon (Pusan National University, Korea) July, 2000.

30. • [12] Klaus Gurlebeck, On some weighted spaces of quaternion-valued functions, Proceedings of the Second ISAACCongress, Vol. 2 (Fukuoka, 1999) (Dordrecht), Int. Soc. Anal. Appl. Comput., vol. 8, Kluwer Acad. Publ., 2000,pp. 1387–1401.

31. • [12] Rauno Aulaskari, On Qp functions, Complex analysis and related topics (Cuernavaca, 1996), Oper. Theory Adv.Appl., vol. 114, Birkhauser, Basel, 2000, pp. 21–29.

32. • • • [13] [27] [21] D. Vukotic, Modern developments of the theory of Bergman spaces, Proceedings of the symposiumon contemporary mathematics: devoted to the 125th anniversary of the Faculty of Mathematics and to 190 years ofteaching mathematics in Serbia, Beograd, Serbia, December 18-20, 1998. Beograd: University of Beograd, Faculty ofMathematics. 131-145 (2000).

33. • [46] Ern Gun Kwon, Growth of mean Lipschitz functions in the complex ball, Trends in Mathematics, InformationCenter for Mathematical Sciences, Volume 3, December 2000, Pages 69–72.

34. • [12] Klaus Gurlebeck, On weighted spaces of monogenic quaternion-valued functions, Clifford analysis and its ap-plications (Prague, 2000), NATO Sci. Ser. II Math. Phys. Chem., vol. 25, Kluwer Acad. Publ., Dordrecht, 2001,pp. 81–89.

35. • [12] K. Gurlebeck and Ahmed El-Sayed, On series expansions of hyperholomorphic Bq functions, Advances in analysisand geometry, Trends Math., Birkhauser, Basel, 2004, pp. 113–129.

36. • [71] D. Vukotic, On the growth of Hardy and Bergman norms of functions in the Dirichlet space, Proceedings of theFirst Advanced Course in Operator Theory and Complex Analysis (Seville, June 2004), Coleccion Actas 59, Universityof Seville, 2006 (A. Montes-Rodrıguez, editor), pp. 147–154.

37. • • [43] [50] Juhani Riihentaus, Weighted boundary behavior and nonintegrability of subharmonic functions, Inter-national Conference on Education and Information Systems: Technologies and Applications (EISTA 2004), Orlando,Florida, USA, July 21-25, 2004, Proceedings, Vol. II, pp. 196-202.

38. • [43] J. Riihentaus, Subharmonic functions, mean value inequality, boundary behavior, non-integrability and exceptionalsets, Complex Analysis and Free Boundary Flows, Transactions of the Institute of Mathematics of the National Academyof Science of Ukraine, 2004. Vol. 1, no. 3, 169-191.

9

39. • [60] M. Mateljevic, Schlicht discs, Bloch theorems, Bloch-Bers space and harmonic maps, Zbornik radova sa konfer-encije posvecene akademiku Veselinu Pericu, 66–79 (Banjaluka 2004).

40. • [66] Gaven J. Martin, Minimising mean distortion, Proceedings of the International Conference on Harmonic Analysisand Applications, Osaka, Japan, November 15–17, 2004, 33–45.

41. • [27] R. F. Shamoyan, On some applications of new characterizations of p-Carleson measures and theorems of diagonalmappings, International Conference “Problems of Modern Mathematics and Mechanics” (Almaty, September 20–22,2005).

42. • [60] D. Girela, C. Gonzalez and J. A. Pelaez, Toeplitz operators and division by inner functions, Proceedings of the firstadvanced course on Operator Theory and Complex Analysis. Alfonso Montes (Editor). Secretariado de Publicaciones,Universidad de Sevilla (2005), 85-103.

43. • • [13] [55] O. Blasco, Introduction to vector valued Bergman spaces, Function spaces and operator theory, 9–30, Univ.Joensuu Dept. Math. Rep. Ser., 8, Univ. Joensuu, Joensuu, 2005.

44. • [72] A. Aleman, M. Carlsson, Anna-Maria Simbotin, Preduals of Qp-spaces and Carleson imbeddings of weightedDirichlet spaces, Joint Meeting of AMS, DMV, and OMG June 16–19, 2005, Johannes Gutenberg University Mainz,Germany.

45. • • • • [31] [43] [50] [93] Juhani Riihentaus, On the weighted boundary behavior of M -subharmonic functions, Proceedingsof the Kiev Workshop, September 2005.

46. • [49] M. Kato, Y. Takahashi, Y. Yamada, Hanner type inequalities and duality, Kyoto Univ. Research InformationRepository, vol. 1484(2006) (Nonlinear analysis and convex analysis), pp. 98–104.

47. • • [43] [93] J. Riihentaus, Separately quasi-nearly subharmonic functions, International Conference on ComplexAnalysis and Potential Theory Satellite to the International Congress of Mathematicians 2006, Gebze Institute ofTechnology Gebze, Turkey, September 8-14, 2006. World Sci. Publ., Hackensack, NJ, 2007, 156–165.

48. • • [31] [74] M. Stoll, The Littlewood-Paley inequalities for Hardy-Orlicz spaces of harmonic functions on domains inRn, Potential theory in Matsue, 363–376, Adv. Stud. Pure Math., 44, Math. Soc. Japan, Tokyo, 2006.

49. • • [43] [93] J. Riihentaus, On the subharmonicity of separately subharmonic functions, Proceedings of the 11th WSEASInternational Conference on applied mathematics, Dallas, Texas, USA, March 22-24, 2007.

50. • [13] O. Blasco, Operators from Hp to lq for 0 < p < 1 ≤ q < ∞, Contemp. Math. 435(2007), 81–87 (FunctionSpaces: Fifth Conference on Function Spaces, May 16-20, 2006).

51. • [62] Young Joo Lee, B. Choe, Note on atomic decompositions of harmonic Bergman functions, Complex Analysis andits Applications, Proceedings of the 15th ICFIDCAA.

52. • [4] E. Reich, Some questions of uniqueness for extremal quasiconformal mappings, Complex analysis and dinamicalsystems III. January 2–6, 2006, Nahariya, Israel, Contemporary Math. 455(2008), 317–323.

53. • [60] E. G. Kwon, On A secure weight (1) related to a Weighted Bergman Space, Proceedings of the 16th InternationalConference on Finite or Infinite Dimensional Complex Analysis and Applications, July 28–August 1, 2008, DonggukUniversity Gyeongju, Korea, pp. 154–158.

54. • [76] A. Aleman, Some open problems on a class of integral operators on spaces of analytic functions, Topics in complexanalysis and operator theory, 139–140, Univ. Malaga, Malaga, 2007.

55. • [84] J.A. Pelaez, Integration operators on Bergman spaces with rapidly decreasing weights Modern Complex Analysisand Operator Theory and Applications, IV El Escorial (Madrid), Spain, June 1721, 2009

56. • • • [79] [43] [93] J. Riihentaus, Separately subharmonic functions and quasi-nearly subharmonic functions, WMSCI2008: 12th World Multi-conference on Systemics, Cybernetics and Informatics, vol V, Proceedings : 53–56 (2008).

57. • • [43] [93] J. Riihentaus, Subharmonic functions, generalizations and separately subharmonic functions, in: TheXIV-th Conference on Analytic Functions, July 22-28, 2007, Cheam, Poland, in: Scientific bulletin of Cheam, Sectionof Mathematics and Computer Science, vol. 2, 2007, pp. 49–76. (ISBN 978-83- 61149-24-8) (arXiv:math/0610259v5[math.AP] 8 Oct 2008).

58. • • • [70] [66] [90] V. Manojlovic, Harmonic quasiconformal mappings in domains in Rn Proceedings of the ICM2010Satellite Conference International Workshop on Harmonic and Quasiconformal Mappings (HQM2010) Editors: D.Minda, S. Ponnusamy, and N. Shanmugalingam, J. Analysis Volume 18 (2010), 297–316.

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59. • • • [66] [70] [106] D. Kalaj and M. Mateljevic, Quasiconformal harmonic mappings and generalizations, Proceedingsof the ICM2010 Satellite Conference International Workshop on Harmonic and Quasiconformal Mappings (HQM2010)Editors: D. Minda, S. Ponnusamy, and N. Shanmugalingam, J. Analysis Volume 18 (2010), 239–260.

60. • • • [60] [90] [102] 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 (2010), 99–128.

61. • [106] D. Bshouty and A. Lyzzaik, Problems and Conjectures in Planar Harmonic Mappings, Proceedings of theICM2010 Satellite Conference International Workshop on Harmonic and Quasiconformal Mappings (HQM2010) Editors:D. Minda, S. Ponnusamy, and N. Shanmugalingam J. Analysis Volume 18 (2010), 6981.

62. • [27] Nicolae Popa, Matrix versions of Hankel operators International Conference of Operator Theory, Timisoara,iunie-iulie 2010.

63. • [84] Jordi Pau and J. A. Pelaez, Volterra type operators on Bergman spaces with exponential weights, Contemp.Math. 561, 231–252, Topics in Complex Analysis and Operator Theory, Third Winter School in Complex Analysis andOperator Theory, February 25, 2010 Universidad Politecnica de Valencia, Valencia, Spain

64. • [78] K.L. Avetisyan, Quaternion-valued harmonic functions in weighted Hardy spaces, Third Russian-Armenian con-ference on mathematical physics, complex analysis, and related topics, October, 2010.

Doctoral theses (67)

65. & [12] R. Zhao, On a general family of function spaces, Ph.D. thesis, Annales Academiae Scientiarum Fennicae. SeriesA I. Mathematica. Dissertationes. 105. Helsinki: Suomalainen Tiedeakatemia. 56 p., 1996.

66. & [62] Ricardo Salazar Torres, Sobre la proyeccion de Bergman en espacios de Herz, Tesis desarrollada en el proyectode Residencia de Investigacion, Licenciatura en Ciencias (Matematicas), Universidad autonoma del estado de Morelos,2002.

67. & [12] Ahmed El-Sayed, On some classes and spaces of holomorphic and hyperholomorphic functions, Dissertation,Bauhaus-Universitat Weimar, January 2003.

68. & & & & & & & & [29] [16] [12] [13] [27] [20] [21] [55] Marc Lengfield, Duality, and multipliers for certain non-locallyconvex hardy-lorentz spaces, PhD Thesis, The Florida State University, College of Arts and Sciences, Spring Semester,2004.

69. & [55] Jose Antonio Prado Bassas, Ciclicidad de coeficientes multiplicadores y subespacios de funciones universales,Thesis, Sevilla, April 2004.

70. & [12] Pasi Mikkonen, On the Wolff potential and quasilinear elliptic equations involving measures, Ann. Acad. Sci.Fenn. Mathematica. Dissertationes. 104. Helsinki: Suomalainen Tiedeakatemia. 71 p. (1996).

71. & [12] J.A. Pelaez, Contribuciones a la teorıa de ciertos espacios de funciones analıticas (Spanish), Doctoral Thesis,Universidad de Malaga (2004).

72. & [31] Kentaro Hirata, Invariant harmonic functions in the unit ball of Cn and Martin kernels of general domains inRn, PhD thesis, Graduate School of Science and Engineering, Shimane University, Japan, March 2005.

73. & [12] Raphaele Supper, Croissance des fonctions sous-harmoniques et des fonctions entiıres dans CN , Institut deRecherche Mathematique Avancee, Strasbourg, 2005.

74. & [13] Liviu-Gabriel Marcoci, Some new results concerning Schur multipliers and duality results between Bergman-Schatten and little Bloch spaces, Department of Mathematics, Lulea University of Technology, 971 87 Lulea, Sweden,June 2009.

75. & [90] V. Kojic, Moduli neprekidnosti kvaziregularnih preslikavanja, Doktorska teza, Beograd, 2009.

76. & [13] Liviu-Gabriel Marcoci, A study of Schur Multipliers and some Banach Spaces of Infinite Matrices, DoctoralThesis, Department of Mathematics, Lulea University of Technology, 971 87 Lulea, Sweden, 2010.

77. & & & & & & [1] [29] [55] [73] [95] [11] PaweÃl Mleczko, Klasyczne Operatory na Przestrzeniach Typu Hardyego, WydziaÃlMatematyki i Informatyki Uniwersytetu im. Adama Mickiewicza, Poznan, 2009.

11

78. & [62] Renata Otahalova, Berezin transforms on spaces of holomorphic and harmonic functions, PhD thesis, SilesianUniversity in Opava, Mathematical Institute in Opava, 2009.

79. & [12] Fang Qin Ye, Weighted Besov Spaces, Fejer–Riesz inequality, and function coefficient estimates, PhD thesis,Shantou University, 2009.

80. & & & & & & & & & & & & & & & & & [12] [75] [67] [78] [83] [57] [62] [44] [48] [53] [59] [63] [1] [74] [84] [88] [80] KarenL. Avetisyan, Weighted spaces of harmonic and holomorphic functions, Armenian J. Math. 2 (2009), n.4. (DoctoralThesis, 225 p., University of Yerevan) 2009.

81. & [75] Renny Jose Malave Malave, Conjuntos de muestreo y operador de composicion sobre espacios tipo Bloch, Trabajode grado presentado como requisito parcial para optar al tıtulo de magister scientiarum en matematica, Universidadde oriente nucleo de sucre escuela de ciencias, departamento de matematicas, Cumana, 2010.

82. & & & [12] [13] [55] Eddy Armand Kwessi Nyandjou, Effcient Rank Regression with Wavelets Estimated Scores, Adissertation submitted to the Graduate Faculty of Auburn University in partial fulfillment of the requirements for theDegree of Doctor of Philosophy, Auburn, Alabama August 6, 2011.

83. & & & Marijan Markovic, [14] [1] [56] Varijante Carlemanove nejednakosti, Master thesis, Beograd 2012.

84. & & & & & Marijan Markovic, [14] [33] [18] [1] [56] Izoperimetrijske nejednakosti i optimalne procene harmonijskihfunkcija, PhD thesis, Beograd .

85. & [91] Sivaguru Ravisankar, Lipschitz properties of harmonic and holomorphic functions, Dissertation, The Ohio StateUniversity, 2011.

86. & & & & & & & & & & [40] [61] [27] [63] [43] [50] [53] [1] [31] [74] O. Djordjevic, Prostori poliharmonijskih funkcija,Doktorski rad, Matematicki fakulet u Beogradu.

Journals (380(sci) + 223(non− sci) = 603)

87. % [12] G.R. Viswanath, On further questions concerning the convergence and singularities of regular Ritt series, J.Indian Math. Soc. (N.S.) 47 (1983), no. 1-4, 207–215 (1986).

88. # [12] Patrick Ahern and Miroljub Jevtic, Duality and multipliers for mixed norm spaces, Mich. Math. J. 30 (1983),no. 1, 53–64.

89. % [12] Chan, Ling-Yau, On Lp-behaviour and Lipschitz behaviour of Dirichlet series and power series, J. Indian Math.Soc. (N.S.) 48 (1984), no. 1-4, 205–214 (1986).

90. # # [12] [13] Miroljub Jevtic, Sous-espaces Hp,q,αE des espaces Hp,q,α de fonctions holomorphes, C. R. Acad. Sci. Paris

Ser. I Math. 300 (1985), no. 8, 221–224.

91. % [10] Y. Kim, Coefficient multipliers of Hp and Gp spaces, Math. Japon. 30(1985), 671-679.

92. # [12] E. G. Kwon, A note on the coefficients of mixed normed spaces, Bull. Austral. Math. Soc. 33(1986), no. 2,253–260.

93. % [16] M. Jevtic, Bounded projections and duality in mixed-norm spaces of analytic functions, Compl. Var. Th. Appl.8(1987), 293–301.

94. # [14] Jacob Burbea, Sharp inequalities for holomorphic functions, Illin. J. Math. 31 (1987), no. 2, 248–264.

95. # [18] Makoto Masumoto, A Characterization of the Kernel of the Poincare Series Operator , Trans. Amer. Math.Soc. 300, No. 2 (1987), 695–704.

96. # [13] J. F. Fournier and William M. Self, Some sufficient conditions for uniform convergence of Fourier series, J.Math. Anal. Appl. 126:2(1987), 355–374.

97. # [12] Hong Oh Kim and Ern Gun Kwon, Weighted subspaces of Hardy spaces, Canad. J. Math. 40(1988), no. 5,1074–1083.

98. % [16] M. Jevtic, Projection theorems, fractional derivatives and inclusion theorems for mixed-norm spaces on the ball,Analysis 9, No.1-2 (1989), 83–105.

99. % [12] Wenjun Zhang, Dpα spaces on bounded symmetric domains, Journal of Henan University, 1989.

12

100. % [24] Boo Rim Choe, An integral mean inequality for Hadamard products on the polydisc, Compl. Var. Th. Appl.13(1990), no. 3-4, 213–215.

101. # [23] Jihuai Shi, Inequalities for the integral means of holomorphic functions and their derivatives in the unit ball ofCn, Trans. Amer. Math. Soc. 328(1991), 619–637.

102. # [12] Yong Chan Kim and E. G. Kwon, On the boundary behaviour and Taylor coefficients for mixed norm spacesDp,q, J. Korean Math. Soc. 28(1991), No.1, pp. 79–86.

103. % [10] Z. Lou, Multipliers of Hp, Gp and Bloch spaces, Math. Japon. 36(1991), 21-26.

104. # # [27] [29] Oscar Blasco, Operators on weighted Bergman spaces (0 < p ≤ 1) and applications, Duke Math. J.66(1992), no. 3, 443–467.

105. % [39] M. Jevtic, Embedding derivatives of M -harmonic tent spaces into Lebesgue spaces, Publications de l’InstitutMathmatique (Beograd) (N.S.) Vol. 52(66), pp. 43–46 (1992)

106. # [27] D. Girela, Mean growth of the derivative of certain classes of analytic functions, Math. Proc. Camb. Ph. Soc.112:2(1992), 335–342.

107. # [12] Jie Miao, A property of analytic functions with Hadamard gaps, Bull. Austral. Math. Soc. 45(1992), no. 1,105–112.

108. % [31] M. Jevtic, A note on the Carleson measure characterization of BMOA functions on the unit ball, Compl. Var.Ell. Eq. 17:3 (1992), 189–194.

109. % [23] Zhangjian Hu, Some estimates for holomorphic functions in the unit ball, Journal of Huzhou Teachers College,60, No. 6 (1992).

110. # # [12] [29] Miroljub Jevtic and Ivan Jovanovic, Coefficient multipliers of mixed norm spaces, Canad. Math. Bull.36(1993), no. 3, 283–285.

111. # [12] E. G. Kwon, On homogeneous expansions of mixed norm space functions in the ball, Canad. Math. Bull.36(1993), no. 1, 78–86.

112. % [12] L. Leindler, Generalizations of some theorems of Mulholland concerning Dirichlet series, Acta Sci. Math.(Szeged) 57 (1993), no. 1-4, 401–418.

113. % [12] L. Leindler, Imrovements of some theorems of Mulholland concerning Dirichlet series, Acta Sci. Math. (Szeged)58 (1993), no. 1-4, 281–297.

114. % [23] Zengjian Lou, On a conjecture of S. Axler, Math. Jap. 40, No.1, 173-177 (1994).

115. # [12] J. H. Shi, Dp spaces on bounded symmetric domains of Cn, Acta Math. Sinica (N.S.) 10(1994), no. 1, 11–18.

116. % % [27] [12] Jihuai Shi, Duality and multipliers for mixed norm spaces in the ball (II), Compl. Var. Th. Appl.25:2(1994), 131-157.

117. % [12] Tingfu Wang, Zhongrui Shi and Guangha Chen, Orlicz sequence spaces endowed with Orlicz norm that areuniformly rotund in evey direction, Acta Sci. Math. (Szeged) 59(1994), 195–208.

118. % [12] L. Leindler, On two theorems of Hardy and Littlewood concerning moment constants, Anal. Math. 20(1994),no. 4, 255–262.

119. % [12] L. Leindler, On power series with positive coefficients, Anal. Math. 20(1994), no. 3, 255–262.

120. % [12] Hasi Wulan, The coefficients of analytic functions in mixed norm spaces, J. Math. (Wuhan) 14:2(1994), 227–232.(Chinese)

121. % [29] I. Jovanovic and Vladimir Rakocevic, Multipliers of mixed-norm sequence spaces and measures of noncompact-ness, Publ. Inst. Math. (Beograd) 56(70)(1994), 61–68.

122. # [27] O. Blasco, A characterization of Hilbert spaces in terms of multipliers between spaces of vector-valued analyticfunctions, Mich. Math. J. 42:3(1995), 537–543.

123. % [12] R. Aulaskary and George Csordas, Besov spaces and Qq,0 classes, Acta Sci. Math. (Szeged) 60(1995), 31–48.

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124. # # # # [29] [12] [13] [27] O. Blasco, Multipliers on spaces of analytic functions, Canad. J. Math. 47(1995), no. 1,44–64.

125. # # [27] [24] J. Burbea and Song-Ying Li, Weighted Hadamard products of holomorphic functions in the ball , Pac. J.Math. 168(1995), no. 2, 235–270.

126. # # [31] [46] M. Jevtic, On the Carleson measure characterization of BMO functions on the unit sphere, Proc. Amer.Math. Soc. 123(1995), no. 11, 3371–3377.

127. # [27] Jian Bin Xiao, Coefficient multipliers of Hp spaces over bounded symmetric domains in Cn, Sci. China Ser. A38 (1995), no. 2, 171–181.

128. % [12] H. Wulan, Hardy-Littlewood theorems in mixed norm spaces on bounded symmetric domains in Cn, Northeast.Math. J. 11(3)(1995), 307–314.

129. % [31] M. Jevtic, Carleson measures in BMO, Analysis 15(1995), 173–185.

130. % % [43] [38] M. Mateljevic, Estimates for gradient, BMO and Lindelof theorem, Publ. Inst. Math. (Beograd)58(72)(1995), 162–166.

131. % [27] Hiroshi Watanabe, An equality of vectors and related topics, Proc. Schl. Sci. Tokai Univ. 30(1995), 9–25.

132. % [12] J. Nemeth, A further note concerning Hardy-Littlewood classical inequalities, Acta Sci. Math. (Szeged) 60(1995),No. 3–4, 571–579.

133. % [27] Fumimasa Ohya, Irie Shimizu, and Hiroshi Watanabe, Coefficient multipliers of Ap,s,α spaces, Proc. Schl. Sci.Tokai Univ. 31(1996), 5–10.

134. # [46] M. Jevtic, Embedding Derivatives of M -Harmonic Hardy Spaces Hp into Lebesgue Spaces, 0 < p < 2, RockyMountain J. Math. Volume 26, Number 1 (1996), 175-187.

135. % [12] K.J. Wirths and Jie Xiao, Image areas of functions in the Dirichlet type spaces and their Mobius invariantsubspaces, Ann. Univ. Mariae Curie-SkÃlodowska Sect. A 50 (1996), 241–24

136. # [12] Jun Soo Choa, A property of series of holomorphic homogeneous polynomials with Hadamard gaps, Bull. Austral.Math. Soc. 53(1996), no. 3, 479–484.

137. # [31] M. Jevtic, A note on M-harmonic Besov p-spaces, Publ. M. (Debrecen) 48(1996), no. 3-4, 307–315.

138. # [12] M. Jevtic, Xavier Massaneda, and Pascal J. Thomas, Interpolating sequences for weighted Bergman spaces ofthe ball , Mich. Math. J. 43(1996), no. 3, 495–517.

139. # [13] Wolfgang Lusky, On generalized Bergman spaces, Studia Math. 119(1996), no. 1, 77–95.

140. % [2] Pavle Milicic, On isomorphisms by orthogonality of a normed space and an inner product space, Publ. Inst.Math. (Beograd) 59(73)(1996), 89–94.

141. % [27] M. Nowak, Integral means of univalent harmonic maps, Ann. Univ. Mariae Curie-SkÃlodowska Sect. A 50(1996),155–162.

142. % % % [31] [46] [40] M. Jevtic, On M-harmonic space Bsp, Publ. Inst. Math. (Beograd) 58(72)(1995), 35–42.

143. # [27] O. Blasco, Vector-valued analytic functions of bounded mean oscillation and geometry of Banach spaces, Illin.J. Math. 41:4(1997), 532–558.

144. % [12] L. Leindler, On the sharpness of inequalities concerning Dirichlet series and integrals, Funct. Approx. Comment.Math. 25(1997), 13–21.

145. # [27] Zengjian Lou, Coefficient multipliers of Bergman spaces Ap. II, Canad. Math. Bull. 40(1997), no. 4, 475–487.

146. % [27] Jian Bin Xiao, Multi-index multipliers of Hp functions on unit hyperspheres, Acta Sci. Natur. Univ. Norm.Hunan. 20(1997), no. 1, 1–4. (Chinese)

147. # [31] M. Stoll, Boundary limits and non-integrability of M-subharmonic functions in the unit ball of Cn (n ≥ 1),Trans. Amer. Math. Soc. 349(1997), no. 9, 3773–3785.

148. # [13] P. Wojtaszczyk, On unconditional polynomial bases in Lp and Bergman spaces, Constr. Approx. 13(1997),no. 1, 1–15.

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149. % [29] I. Jovanovic and V. Rakocevic, Multipliers of mixed-norm sequence spaces and measures of noncompactness. II ,Mat. Vesnik 49(1997), 197–206.

150. % [42] Miroljub Jevtic, Besov spaces on bounded symmetric domains, Mat. Vesnik 49(1997), 229–233.

151. # [46] B. R. Choe and Y. J. Lee, On M-harmonic Bloch functions and their Carleson measures, Glasgow Math. J.40(1998), 273–289.

152. # # # [31] [46] [61] Miroljub Jevtic, A note on BMO and Bloch space of generalized (α, β)-harmonic functions, J.Math. Anal. Appl. 224:2(1998), 332–348.

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199. % % [27] [55] R. F. Shamoyan, On some properties of the partial sums of Teylor series of functions analytic in the unitdisk, Fund. Prikl. Mat. 8:4(2002), 1225–1233. (in Russian)

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222. # # [27] [55] R. F. Shamoyan, Action of convolution and Toeplitz operators in spaces of BMOA type, M. Zametki73:5(2003), 759–772.

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312. % [12] Yong Chen, The inclusion relationships of weighted Dirichlet spaces, J. Zhejiang Normal Univ. (Natural Science),Article ID: 1001–5051(2008), 01-0033-04.

313. # [31] Boo Rim Choe, Hyungwoon Koo, and Wayne Smith, Carleson measures for the area Nevanlinna spaces andapplications, J. Anal Math. 104(2008), 207–233.

314. # # [60] [1] Hong Rae Cho, Su-mi Kwon, and Jinkee Li, Characterization of the weighted Lipschitz function by theGarsia-type norm on the unit ball, Taiwanese J. Math. 12:3(2008), 741–751.

315. # [88] Songxiao Li and S. Stevic, Some characterizations of the Besov space and α-Bloch space, J. Math. Anal. Appl.346:1(2008), 262–273.

316. # # [48] [44] K. L. Avetisyan, Weighted integrals and Bloch spaces of n-harmonic functions on the polydisc, PotentialAnal. 29:1(2008), 49–63.

317. # # [12] [75] F. Perez-Gonzalez and J. Rattya, Univalent functions in Hardy, Bergman, Bloch and related spaces, J.Anal. Math. 105(2008), 125–148.

21

318. % % [27] [96] R. F. Shamoyan and O. Mihic, In search of traces of some holomorphic spaces on polyballs, Revista Notasde Matemtica Vol.4(2),No. 264 (2008), 1–23.

319. # [70] Xingdi Chen and Ainong Fang, A note on harmonic quasiconformal mappings, J. Math. Anal. Appl. 348:2(2008),607–613.

320. # # # # # # # [29] [12] [13] [27] [20] [21] [55] M. Lengfield, A nested embedding theorem for Hardy-Lorentz spaceswith applications to coefficient multiplier problems, Rocky Mount. J. Math. 38:4(2008), 1215–1251.

321. # # # [43] [79] [93] J. Riihentaus, Quasi-nearly subharmonicity and separately quasi-nearly subharmonic functions, J.Inequal. Appl. Vol. 2008(2008), Article ID 149712.

322. # [12] Jizhen Zhou, Lacunary series in Q(K) type spaces, J. Function Spaces Appl. 6(3)(2008), 293–301.

323. % % [60] [91] M. Mateljevic, Versions of Koebe 1/4 theorem for analytic and quasiregular harmonic functions andapplications, Publ. Inst. Math. (Beograd) 84(98) (2008), 61–72.

324. # [1] Heungju Ahn, Hong Rae Cho, and Jong-Do Park, Holder type estimates for the ∂-equation in strongly pseudoconvexdomains, Rend. Sem. Mat. Univ. Padova 120(2008), 127-138.

325. % [1] Mirjana Pavlovic, Jensens functional and polynomials, Applicable Anal. Discr. Math. 2(2008), no. 2, 175–182

326. % [66] Xinzhong Huang, Harmonic Quasiconformal Homeomorphism of the Unit Disk, Chinese Ann. Math. Ser. A29(4) (2008), 519–524.

327. % % [66] [70] D. Kalaj and M. Mateljevic, Quasiconformal and harmonic mappings between smooth Jordan domains,Novi Sad J. Math. 38, No. 3 (2008), 147–156.

328. # [1] Mirjana Pavlovic, Nenad Cakic, Miloje Rajovic, Stojan Radenovic, A generalization of Jensen’s inequality forpolynomials having concentration at low degrees, Computers Math. Appl. 57 (2009) 332–337.

329. # [96] O. Mihic and R.F. Shamoyan, On traces of holomorphic functions on the unit polyball, Applicable Analysis andDiscrete Mathematics 2009, vol. 3, No. 2, 198-211

330. # # [75] [84] C. Gonzalez and J. A. Pelaez, Univalent functions in Hardy spaces in terms of the growth of arc-length,J. Geom. Anal. 19 (2009), No. 4 755–771.

331. % [96] O. Mihic and R.F. Shamoyan, Some remarks on weakly invertible functions in the unit ball and polydisk, IranianJournal of Mathematical Sciences and Informatics Vol. 4, No. 1 (2009), pp. 43–54.

332. # [96] O. Mihic and R.F. Shamoyan, Analytic classes on subframe and expanded eisk and the Rs differential operatorin polydisk, Journal of Inequalities and Applications Volume 2009, Article ID 353801, 22 pages

333. % % [27] [69] Zhen Yang, Hadamard product and Lipschitz spaces, J. Shantou University 24:4 (2009)

334. # [12] Jordi Pau and J. A. Pelaez, Multipliers on Mobius invariant Qs spaces, Math. Zeit. 261:3(2009), 545–555.

335. # [1] Nicolae Popa, A characterization of upper triangular trace class matrices, C. R. Acad. Sci. Paris, Ser. I V 347,Issues 1-2 (2009), 59–62.

336. % [12] Jin Zhuang and Mu-jun Zhan, Random series in Bp spaces, Journal of Southwest University for Nationalities –Natural Science Edition 35:1 (2009)

337. # [67] Lili Chen, Yunan Cui, Henryk Hudzik, Criteria for complex strongly extreme points of Musielak-Orlicz functionspaces, Nonlinear Anal.: Th. Methods Appl. 70:6 (2009), 2270–2276.

338. # [31] Evgueni Doubtsov, Characterizations of the hyperbolic Nevanlinna class in the ball, Compl. Var. Ellip. Eq.54:2 (2009), 119–124.

339. # [75] Yong Chan Kim and Toshiyuki Sugawa, Uniformly locally univalent functions and Hardy spaces, J. Math. Anal.Appl. 353:1 (2009), 61–67.

340. # [62] Eun Sun Choi and Kyunguk Na, Characterizations of the harmonic Bergman space on the ball, J. Math. Anal.Appl. 353:1 (2009), 375–385.

341. # # [53] [62] Young Joo Lee, The atomic decomposition of harmonic Bergman functions, dualities and Toeplitz opera-tors, Bull. Korean Math. Soc. 46 (2009), No. 2, 263–279.

22

342. # [92] Ahmed El-Sayed, Criteria for functions to be weighted Bloch, J. Comput. Anal. Appl. 11 (2)(2009), 252–262.

343. % % [70] [66] V. Kojic, Bi-Lipschicity of quasiconformal harmonic mappings in the plane, Filomat (Nis) 23:1(2009),85–89.

344. # [65] Secil Gergun, H. Turgay Kaptanoglu, and A. Ersin Ureyen, Reproducing kernels for harmonic Besov spaces onthe ball, C. R. Acad. Sci. Paris, Ser. I Math. 347(11-12) (2009), 735–738.

345. # [74] S. Stevic, A short proof of a Littlewood-Paley inequality in the unit ball, Utilitas Mathematica 78(2009), 239–242.

346. # [13] L.G. Marcoci, L.E. Persson, I. Popa, N. Popa, A new characterization of Bergman-Schatten spaces and a dualityresult, J. Math. Anal. Appl. 360:1 (2009), 67–80.

347. % % % [91] [77] [90] M. Arsenovic and V. Manojlovic, On the modulus of continuity of harmonic quasiregular mappingsin the unit ball of Rn, Filomat (Nis) 23:3 (2009), 199–202.

348. % % % % [53] [78] [62] [83] Karen Avetisyan, Klaus Gurlebeck, and Wolfgang Sprossig, Harmonic Conjugates inWeighted Bergman Spaces of Quaternion-Valued Functions, Computational Methods and Function Theory 9(2009),No. 2, 593–608.

349. # [84] K. Avetisyan and S. Stevic, Holomorphic Functions on the Mixed Norm Spaces on the Polydisc II, J. Comp.Anal. Appl. 11:2(2009), 239–251.

350. # # [66] [70] D. Kalaj, Lipschitz spaces and harmonic mappings, Ann. Acad. Sci. Fenn. 34(2009), 475–485.

351. # # [88] [97] Songxiao Li and Hasi Wulan, Characterizations of Qp spaces in the unit ball of Cn, J. Math. Anal.Appl. 360:2(2009), 689–696.

352. # [53] G. B. Ren, U. Kahler, Almansi decomposition for poly-ultrahyperbolic functions, Acta Math. Sinica (Engl. Ser.)25(9)(2009), 1561–1566.

353. # # [27] [75] M. Jevtic, Blaschke products in Lipschitz spaces, Proc. Edinb. Math. Soc. 52:2(2009), 689–705.

354. % % % [43] [87] [93] J. Riihentaus, On an inequality related to the radial growth of subharmonic functions, Cubo aMath. J. 11, No. 4(2009), 127–136.

355. % [12] A. El-Sayed Ahmed, Lacunary series in quaternion Bp,q spaces, Compl. Var. Ell. Eq. 54(7) (2009), 705–723.

356. # [59] M.R. Dostanic, Multipliers in the space of analytic functions with exponential mean growth, Asymptotic Anal.65(2009), no. 3-4, p. 191-201.

357. # # # # [50] [43] [87] [93] J. Riihentaus, Subharmonic functions, generalizations, weighted boundary behavior, andseparately subharmonic functions: A survey, Nonlinear Analysis, Theory Methods Appl. 71(12)(2009), 2613–2627.

358. # # [66] [70] D. Kalaj, On quasiregular mappings between smooth Jordan domains, J. Math. Anal. Appl. 362:1 (2010),58-63.

359. % [1] V.V. Savquk, Vlastivost� tvirn�h �der golomorfnih finkc�� i ekstremal~n� zadaqi teori� i nabli�enn�,Zb�rnik prac~ In-tu Mat. NAN Ukra�ni, 7:1(2010), 235–263.

360. % [66] Xinzhong Huang, Locally univalent harmonic mappings with linearly connected image domains, Chinese AnnalsMath. Series A 31:5 (2010)

361. # [96] O. Mihic and R.F. Shamoyan, On some inequalities in holomorphic function theory in polydisk related todiagonal mapping, Czechoslovak Mathematical Journal, vol. 60 (2010), issue 2, pp. 351-370

362. % [96] R. Shamoyan and O. Mihic, On new estimates for distances in analytic function spaces in the unit disk, thepolydisk and the unit ball, Bolettın de la Asociacion Matematica Venezolana, Vol. XVII, No. 2 (2010) 89–102

363. # [69] A. El-Sayed Ahmed, M.A. Bakhit, Hadamard product and NK spaces, Mathematical and Computer Modelling51(1-2), 2010, 33-43.

364. % % % % % [79] [43] [50] [1] [93] Oleksiy Dovgoshey and Juhani Riihentaus, Bi-Lipschitz Mappings and QuasinearlySubharmonic Functions, International Journal of Mathematics and Mathematical Sciences Volume 2010 (2010), ArticleID 382179, 8 pages

365. % [66] Jian-feng Zhu, Estimates for the dilatation of harmonic quasiconformal mappings of the unit disk, J. HuaqiaoUniv. (Natural Science) 2010 Vol 31, No. 4, 476–479.

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366. % [62] Miroslav Englis, Berezin transform on the harmonic Fock space, J. Math. Anal. Appl. 367:1 (2010), 75–97.

367. % % % % % % J. Riihentaus, [23] [43] [50] [87] [93] [105] On an inequality related to the radial growth of quasinearlysubharmonic functions in locally uniformly homogeneous spaces, Journal of Mathematical Sciences: Advances andApplications, 6, No. 1 (2010), 17–40.

368. # # [27] [69] Hao Li, Hasi Wulan and JiZhen Zhou, Lipschitz spaces and QK type spaces, Science China, Ser. A. 53No. 3 (771–778), 2010.

369. # # [85] [60] Mikael Lindstrom and Amir H. Sanatpour, Derivative-free characterizations of compact generalizedcomposition operators between Zygmund type spaces, Bull. Australian Math. Soc. 81 (2010), 398–408.

370. # # # # [73] [95] [1] [29] MieczysÃlaw MastyÃlo, PaweÃlMleczko, Solid hulls of quasi-Banach spaces of analytic functionsand interpolation, Nonlinear Analysis: Theory, Methods Applications 73:1 (2010), 84–98.

371. % % [56] [96] R.F.Shamoyan and Haiying Li, On weakly invertible functions in the unit ball and polydisk and relatedproblems, Journal of Mathematical Analysis 1(2010), 8–19.

372. # # [66] [70] M. Mateljevic, V. Bozin and M. Knezevic, Quasiconformality of harmonic mappings between Jordandomains, Filomat 24:3(2010), 111–124.

373. # # [66] [70] M. Mateljevic, V. Bozin, Some counterexamples related to the theory of HQC mappings, Filomat 24:4(2010), 25–34.

374. # # [66] [70] D. Kalaj Quasiconformal harmonic mappings and closes to convex domains, Filomat 24:1 (2010), 63–68.

375. # # # [50] [66] [70] M. Mateljevic and M. Vuorinen, On harmonic quasiconformal quasiisometries, J. InequalitiesAppl. Volume 2010 (2010), Article ID 178732, 19 pages

376. # # [59] [84] J. Pau and J.A. Pelaez, Embedding theorems and integration operators on Bergman spaces with rapidlydecreasing weights, J. Funct. Anal. 259:10, 15 (2010), 2727–2756.

377. # # # [66] [70] [106] D. Kalaj, M Mateljevic, Harmonic q.c. self-mapping and Mobius transformations of the unitball Bn, Pacific J. Math. 247, No. 2 (2010), 389-406.

378. % % [12] [75] K.L. Avetisyan, Lacunary series in mixed norm spaces in the disc, J. Contemp. Math. Anal. (ArmenianAcad. Sci.) 45:5 (2010), 258265.

379. % % % % % [43] [23] [87] [79] [93] O. Dovgoshey and J. Riihentaus, A remark concerning generalized mean valueinequalities for subharmonic functions, Trans. Inst. Acad. Sci. Ukraine 7, No.2 (2010), 26–33.

380. # [88] Songxiao Li, Some new characterizations of weighted Bergman spaces, Bull. Korean Math. Soc. 47, No. 6,(2010), 1171–1180.

381. # [62] Boo Rim Choe, Hyungwoon Koo, Kyesook Nam, Optimal norm estimate of operators related to the harmonicBergman projection on the ball, Tohoku Math. J. 62:3(2010), 357–374.

382. % % [66] [70] Jian-feng Zhu, Extension Theorem for Quasiconformal Harmonic Homeomorphism of a Half-plane,Journal Of Zhangzhou Teachers College(Natural Science Edition) 23(2) (2010)

383. # [10] J. J. Donaire, D. Girela, and D. Vukotic, On the growth and range of functions in Mbius invariant spaces, J.Anal. Math. 112 (2010), no.1, 237–260.

384. # # [27] [96] O. Mihic and R.F.Shamoyan, A note on traces of some holomorphic spaces on polyballs, J. FunctionSpaces Appl. 8(2010), no. 3, 271–285.

385. # # [27] [69] Zhou, Jizhen, Hadamard product in F (p, q, s) spaces, J. Function Spaces Appl. 8:3(2010), 257–270.

386. # [88] S.X. Li and H.S. Wulan, Some new characterizations of Bloch spaces, Taiwanese J. Math. 14:6 (2010), 2245–2259.

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2011–

387. % % [107] [109] Mao, Zhiqiang and Wu, Die One property of an analytic function in the unit disc (Chinese) J. JiangxiNorm. Univ., Nat. Sci. Ed. 35, No. 6, 608-609 (2011).

388. # [12] Ahmed El-Sayed, Lacunary Series in Weighted Hyperholomorphic Bp, Bq(G) Spaces Numerical Funct. Anal.Optimization 32:1 (2011), 41–58.

389. # [14] D. Kalaj and Romeo Mestrovic, Isoperimetric type inequalities for harmonic functions, J. Math. Anal. Appl.173:2 (2011), 439–448.

390. % % [56] [96] Romi Shamoyan and Haiying Li, The weak invertibility in the unit ball and polydisk and related problems,Acta Universitatis Apulensis 26 (2011), 53–68.

391. # # # [66] [70] [106] D. Kalaj, M Mateljevic, On certain nonlinear elliptic PDE and quasiconfomal mapps betweenEuclidean surfaces, Potential Analysis 34 (2011), 13–22.

392. # # # [12] [53] [81] Xiaomin Tang, Zhangjian Hu, and Xiaofen Lv, Derivatives of harmonic mixed norm and Bloch-typespaces in the unit ball of RN, Acta Mathematica Scientia, 31:1 (2011), 81–92.

393. # [14] Jie Xiao and Kehe Zhu, Volume integral means of holomorphic functions, Proc. Amer. Math. Soc. 139:4 (2011),1455–1465.

394. # [72] Shanli Ye and Zengjian Lou, Cyclic vectors and cellular indecomposable operators on Qp spaces, Acta Math.Scientia 31B(2) (2011), 434–440.

395. # # [12] [75] P. Galanopoulos, D. Girela, and J. A Pelaez, Multipliers and integration operators on Dirichlet spaces,Trans. Amer. Math. Soc. 363 (2011) 1855–1886.

396. # # # [66] [106] [70] D. Kalaj, On the quasiconformal self-mappings of the unit ball satisfying the Poisson differentialequations Ann. Acad. Sci. Fenn. Math. 36 (2011), 177–194.

397. # # # [62] [43] [99], Boo Rim Choe and Kyesook Nam, Double integral characterizations of harmonic Bergman spaces,J. Math. Anal. Appl. 379:2 (2011), 889–909.

398. # [66] N.-T. Koh and L.V. Kovalev, Area contraction for harmonic automorphisms of the disk, Bull. Lond. Math.Soc. 43 (2011), 91–96.

399. # # # # # [66] [70] [91] [77] [90] M. Arsenovic, V. Bozin, and V. Manojlovic, Moduli of Continuity of HarmonicQuasiregular Mappings in Bn, Potential Anal. 34 (2011), no. 3, 283–291.

400. # [66] Zhu, Jian-Feng; Zeng, Xiao-Ming, Estimate for Heinz Inequality in the Small Dilatation of Harmonic Quasicon-formal Mappings, J. Comput. Anal. Appl. 13 (2011), no. 6, 1081–1087.

401. # [62] Congwen Liu and Lifang Zhou, Norm of an Integral Operator Related to the Harmonic Bergman Projection,Integral Eq. Oper. Th. 69 (2011), no. 4, 557–566.

402. # # # [56] [14] [33] D. Kalaj, Isoperimetric inequality for the polydisk, Annali Mat. Pura Appl. 190 (2011), no. 2,355–369.

403. % [1] Viktor Savchuk Approximation of some classes of holomorphic functions and properties of generating kernels,Azerbaijan J. Math. 1 (2011), No 1, 1–16.

404. # [106] D. Kalaj, Estimates of gradient and of Jacobian of harmonic mappings defined in the unit disk, Proc. Amer.Math. Soc. 139 (2011), 2463–2472.

405. # [90] D. Kalaj and V. Manojlovic, Subharmonicity of the modulus of quasiregular harmonic mappings, J. Math. Anal.Appl. 379 (2011) no. 2, 783–787.

406. # [27] S. Naik, Cesaro type operators on spaces of analytic functions, Filomat 25:4 (2011), 85–97.

407. # # # # [66] [70] [1] [106] D. Kalaj, Invertible harmonic mappings beyond Kneser theorem and quasiconformalharmonic mappings, Studia Math. 207 (2011), 117–136.

408. % % [93] [43] J. Riihentaus, Domination conditions for families of quasinearly subharmonic functions, Inter. J. Math.Math. Sci. Volume 2011 (2011), Article ID 729849.

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409. # # [75] [10] D. Girela, C. Gonzalez, and M. Jevtic, Inner functions in Lipschitz, Besov, and Sobolev spaces, Abstractand Applied Analysis. Volume 2011, Article ID 626254, 26 pages.

410. # # [60] [90] SH. Chen, S. Ponnusamy, and X. Wang, On planar harmonic Lipschitz and planar harmonic Hardyclasses, Ann. Acad. Sci. Fenn. 36 (2011), 567–576.

411. # # [66] [70] David Kalaj and Miodrag Mateljevic, On quasiconformal harmonic surfaces with rectifiable boundary,Compl. Anal. Oper. Theory 5 (2011), no. 3, 633–646.

412. % [66] Xin-zhong Huang and Dong-mian Fu, Some new developments for complex-valued harmonic mappings, JournalOf Zhangzhou Normal University (Natural Science Edition) No. 4 (2011) (in Chinese)

413. # [12] Hasi Wulan and Fang Qin Ye, The Fejer-Riesz Inequality for the Besov Spaces, Acta Mathematica Sinica, EnglishSeries 2011, Vol. 27, No. 10, pp. 1995-2004.

414. # # [102] [1] D. Kalaj and M. Vuorinen, On harmonic functions and the Schwarz lemma, Proc. Amer. Math. Soc.140 (2012), 161–165.

415. % % [62] [96] M. Arsenovic and R.F. Shamoyan, On some extremal problems in spaces of harmonic functions, ROMAI.,7 1(2011), 13–24.

416. % % % [27] [55] [104] M. Arenovic and R.F. Shamoyan, On multipliers of mixed -norm analytic F p,qα type spaces on

the unit polydisc, Journal of Siberian Federal University. Mathematics and Physics 2012, 5(4), 471479.

417. # # # [66] [70] [106] D. Kalaj, Harmonic mappings and distance function, Annali della Scuola Normale Superiore diPisa, Classe di Scienze (5), Vol. X (2011), 669–681.

418. # # # [90] [98] [99] S. Chen, S. Ponnusamy, X. Wang, Harmonic mappings in Bergman spaces, Monatshefte frMathematik, 2012

419. # # [75] [84] F. Perez-Gonzalez and J. Rattya, Univalent functions in the Mobius invariant QK spaces, Abstr. Appl.Anal. Volume 2011 (2011), Article ID 259796, 11 pages doi:10.1155/2011/259796

420. % [75] Rene Erlın Castillo and Julio Cesar Ramos Fernandez, Sampling type sets and composition operators on Bloch-type spaces, Bol. Mat. 18, no.1 (2011), 39–54.

421. % [96] Trace theorems in harmonic function spaces on (Rn+1+ )m, multipliers theorems and related problems, Kragujevac

J. Math. 35, no. 3(2011), 411–430.

422. # # # [66] [106] [70] D. Kalaj and M. Mateljevic, On (K, K ′)-quasiconformal harmonic mappings, Potential Anal.36 (1) (2012), 117–135;

423. # [1] M.T. Karaev, A Characterization of Some Function Classes Journal of Function Spaces and Applications Volume2012 (2012), Article ID 796798, 5 pages

424. # # # # [83] [57] [74] [31] M. Stoll, Weighted Dirichlet spaces of harmonic functions on the real hyperbolic ball,Complex Var. Ell. Eq. 57, no. 1(2012), 63–89.

425. % [26] M. Arsenovic and R. F. Shamoyan, On embeddings, traces and multipliers in harmonic function spaces, Kragu-jevac J. Math.

426. % [75] K. L. Avetisyan, A note on mixed norm spaces of analytic functions, Australian J. Math. Anal. Appl. 9:1(2012) 1–6.

427. # [70] Xingdi Chen and Ainong Fang, Harmonicity of the inverse of a harmonic diffeomorphism, J. Math. Anal. Appl.389:1 (2012), 647–655.

428. % [34] Yurii S. Kolomoitsev, On moduli of smoothness and K-functionals of fractional order in the Hardy spaces,Journal of Mathematical Sciences 181, no. 1 (2012), 78–97.

429. # # [75] [98] Sh. Chen, S. Ponnusamy, and X.T. Wang, Integral means and coefficient estimates on planar harmonicmappings, Ann. Acad. Sci. Fenn. 37 (2012), 69-79.

430. # # # [66] [70] [106] D. Kalaj, On boundary correspondence of q.c. harmonic mappings between smooth Jordandomains, Math. Nachr. 285 (2-3) (2012), 283–294.

431. % [66] Jianfeng Zhu, Harmonic quasiconformal mappings of the unit disk onto convex domains Adv. Math. (China)41:1 (2012)

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432. % [84] J.A. Pelaez and J. Pau, Volterra type operators on Bergman spaces with exponential weights, Contemp. Math.561(2012), 239–252.

433. % % [70] [66] Xingdi Chen, Hyperbolically Bi-Lipschitz Continuity for 1/|w|2-Harmonic Quasiconformal Mappings,International Journal of Mathematics and Mathematical Sciences Volume 2012, Article ID 569481, 13 pages

434. % % % [26] [37] [62] M. Arsenovic and R.F. Shamoyan, Sharp theorems on multipliers and distances in harmonicfunction spaces in higher dimension, Journal of Siberian Federal University. Mathematics and Physics 2012, 5(3),291-302.

435. # [12] Hasi Wulan and Fang Qin Ye, The Fejer-Riesz inequality for the Besov spaces, Acta Math. Sinica 27:101995–2004.

436. # # [43] [93] P. Koskela and V. Manojloivic, Quasi-nearly subharmonic functions and quasiconformal mappings,Potential Anal. 37(2)(2012), 187–196.

437. # [66] D. Partyka and Ken-Ichi Sakan, A simple deformation of quasiconformal harmonic mappings in the unit disk,Ann. Acad. Sci. Fenn. 37 (2012), 539-556.

438. # # [66] [70] Min Chen and Xingdi Chen, (K, K ′)-quasiconformal harmonic harmonic mappings of the upper half planeonto itself, Ann. Acad. Sci. Fenn. 37 (2012), 265-276.

439. # # # [66] [70] [106] D. Kalaj, Quasiconformal harmonic mapping between C1,µ euclidean surfaces, Monats. Math.167(2) (2012), 205–229.

440. # # # [46] [25] [34] E. G Kwon, H. R. Cho, H. Koo Holomorphic mean lipschitz functions on the unit ball of CN , J.Korean Math. Soc, 50 (2013), 189–202.

441. % % [53] [62] K. Avetisyan and Y. Tonoyan, Continuous embeddings in harmonic mixed norm spaces on the unit ballin Rn, Journal of Contemporary Mathematical Analysis September 2012, Volume 47, Issue 5, pp 209–220

442. # [53] Z. Cuckovic and Trieu Le, Toeplitz operators on Bergman spaces of polyanalytic functions, Bull. Lond. Math.Soc. (2012) 44 (5): 961-973.

443. # [106] D. Kalaj, Cauchy transform and Poissons equation, Advances Math. Volume 231, Issue 1, 10 (2012), 213242

444. % % [60] [90] Sh. Chen, S. Ponnusamy and X. Wang, Equivalent moduli of continuity, Bloch’s theorem for pluriharmonicmappings in Bn, Proc. Indian Acad. Sci. (Math. Sci.) 122 (4):583-595 (2012)

445. % % % [62], [26], [37] M. Arsenovic and R. F. Shamoyan, Sharp theorems on multipliers in harmonic function spaces inhigher dimension, ACTA ET COMMENTATIONES UNIVERSITATIS TARTUENSIS DE MATHEMATICA Volume16, Number 2, 2012

446. Kjersti Solberg Eikrem, # # [107] [109] Hadamard gap series in growth spaces, Collectanea Mathematica, 64 (1):1-15,2012

447. # [92] Sh. Chen, S. Ponnusamy, and X. Wang Weighted Lipschitz continuity, Schwarz-Pick’s Lemma and Landau-Bloch’s theorem for hyperbolic harmonic functions in the unit ball, Mathematical Modelling and Analysis 18:1 (2013),66–79.

To appear

448. D. Kalaj, M. Markovic, M. Mateljevic, # # [1] [33] Charatheodory and Smirnov type theorem for harmonic mappings,Ann. Acad. Sci. Fenn. Math..

449. # [66] D. Kalaj, Gauss map of a harmonic surface, Indag. Math.

450. # [42] D. Kalaj and M. Markovic, Norm of the Bergman projection, Math. Scand.

451. # [98] Greg Knese Uchiyamas lemma and the John-Nirenberg inequality, Bull. London Math. Soc.

452. # # [66] [70] Y.L. Shen, H.X. Liu, L.J. Wang Zygmund functions on the real line and quasiconformal deformations,Sci. China Ser. A

453. # # # # [62] [65] [37] [26] M. Arsenovic and R.F. Shamoyan, On some new theorems on multipliers in harmonicfunction spaces in higher dimension II, Bull. Korean Math. Soc.

27

454. # # [91] [60] Sivaguru Ravisankar, Transversally Lipschitz Harmonic Functions are Lipschitz, Complex Var. EllipticEqu.

455. # # [66] [106] D. Kalaj, S.Ponnusamy, and M. Vuorinen, Radius of close-to-convexity of harmonic functions, ComplexVar. Elliptic Equ.

456. # # [66] [106] D. Kalaj, A priori estimate of gradient of a solution to certain differential inequality and quasiconformalmappings, J. Anal. Math.

457. # # [12] [13], E. Kwessi, G. De Souza, A. Abebe, and R. Aulaskari, Characterization of lacunary functions in weightedBergmanBesovLipschitz spaces, Compl. Var. Ell. Eq.

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