Abstract
Let ϕ be an inner function, and let ϕ = BS be its canonical decomposition.
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References
Ahern P (1979) On a theorem of Hayman concerning the derivative of a function of bounded characteristic. Pacific J Math 83(2):297–301
Ahern P, Clark D (1971) Radial nth derivatives of Blaschke products. Math Scand 28:189–201
Ahern P, Clark D (1974) On inner functions with H p-derivative. Michigan Math J 21:115–127
Ahern P, Clark D (1976) On inner functions with B p derivative. Michigan Math J 23(2):107–118
Allen H, Belna C (1972) Singular inner functions with derivative in B p. Michigan Math J 19:185–188
Belna C, Muckenhoupt B (1977) The derivative of the atomic function is not in B 2 ∕ 3. Proc Am Math Soc 63(1):129–130
Belna C, Colwell P, Piranian G (1985) The radial behavior of Blaschke products. Proc Amer Math Soc 93(2):267–271
Beurling A (1948) On two problems concerning linear transformations in Hilbert space. Acta Math 81:239–255
Blaschke W (1915) Eine erweiterung des satzes von vitali über folgen analytischer funktionen. Leipzig Ber 67:194–200
Bourgain J (1993) On the radial variation of bounded analytic functions on the disc. Duke Math J 69(3):671–682
Carathéodory C (1929) Über die winkelderivierten von beschränkten analytischen funktionen. Sitzunber Preuss Akad Wiss 32:39–52
Cargo G (1961) The radial images of Blaschke products. J London Math Soc 36: 424–430
Caughran J, Shields A (1969) Singular inner factors of analytic functions. Michigan Math J 16:409–410
Cohn W (1983) On the H p classes of derivatives of functions orthogonal to invariant subspaces. Michigan Math J 30(2):221–229
Collingwood EF, Lohwater AJ (1966) The theory of cluster sets. Cambridge tracts in mathematics and mathematical physics, No 56. Cambridge University Press, Cambridge
Colwell P (1985) Blaschke products. University of Michigan Press, Ann Arbor. Bounded analytic functions
Cullen M (1971) Derivatives of singular inner functions. Michigan Math J 18:283–287
Duren P, Schuster A (2004) Bergman spaces, volume 100 of mathematical surveys and monographs. American Mathematical Society, Providence
Duren P, Romberg B, Shields A (1969) Linear functionals on H p spaces with 0 < p < 1. J Reine Angew Math 238:32–60
Fatou P (1906) Séries trigonométriques et séries de Taylor. Acta Math 30(1):335–400
Fricain E, Mashreghi J (2008) Integral means of the derivatives of Blaschke products. Glasg Math J 50(2):233–249
Frostman O (1935) Potentiel d’équilibre et capacité des ensembles avec quelques applications à la théorie des fonctions. Meddel Lund Univ Mat Sem 3
Frostman O (1942) Sur les produits de Blaschke. Kungl. Fysiografiska Sällskapets i Lund Förhandlingar [Proc Roy Physiog Soc Lund] 12(15):169–182
Girela D, Peláez J, Vukotić D (2007) Integrability of the derivative of a Blaschke product. Proc Edinb Math Soc (2), 50(3):673–687
Hardy G, Littlewood J (1932) Some properties of fractional integrals. II. Math Z 34(1):403–439
Hedenmalm H, Korenblum B, Zhu K (2000) Theory of Bergman spaces, volume 199 of graduate texts in mathematics. Springer, New York
Heins M (1951) A residue theorem for finite Blaschke products. Proc Amer Math Soc 2:622–624
Herglotz G (1911) Über potenzreihen mit positivem, reellen teil in einheitskreis. S-B Sächs Akad Wiss Leipzig Math-Natur Kl 63:501–511
Julia G (1920) Extension nouvelle d’un lemme de Schwarz. Acta Math 42(1):349–355
Linden C (1976) H p-derivatives of Blaschke products. Michigan Math J 23(1):43–51
Lucas F (1874) Propriétés géométriques des fractionnes rationnelles. CR Acad Sci Paris 77:631–633
Mashreghi J (2002) Expanding a finite Blaschke product. Complex Var Theory Appl 47(3):255–258
Mashreghi J (2009) Representation theorems in Hardy spaces, volume 74 of london mathematical society student texts. Cambridge University Press, Cambridge
Mashreghi J, Shabankhah M (2009) Integral means of the logarithmic derivative of Blaschke products. Comput Methods Funct Theory 9(2):421–433
Nevanlinna R (1929) Über beschränkte analytische funcktionen. Ann Acad Sci Fennicae A 32(7):1–75
Plessner A (1923) Zur theorie der konjugierten trigonometrischen reihen. Mitt Math Sem Giessen 10:1–36
Privalov I (1918) Intégral de cauchy. Bulletin de l’Université, à Saratov
Privalov I (1924) Sur certaines propriétés métriques des fonctions analytiques. J de l’École Polytech 24:77–112
Protas D (1973) Blaschke products with derivative in H p and B p. Michigan Math J 20:393–396
Riesz F (1923) Über die Randwerte einer analytischen Funktion. Math Z 18(1):87–95
Riesz M (1931) Sur certaines inégalités dans la théorie des fonctions avec quelques remarques sur les géometries non-euclidiennes. Kungl Fysiogr Sällsk i Lund 1(4): 18–38
Rudin W (1955) The radial variation of analytic functions. Duke Math J 22:235–242
Seidel W (1934) On the distribution of values of bounded analytic functions. Trans Am Math Soc 36(1):201–226
Tsuji M (1959) Potential theory in modern function theory. Maruzen, Tokyo
Vukotić D (2003) The isoperimetric inequality and a theorem of Hardy and Littlewood. Am Math Mon 110(6):532–536
Walsh JL (1939) Note on the location of zeros of the derivative of a rational function whose zeros and poles are symmetric in a circle. Bull Am Math Soc 45(6):462–470
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Mashreghi, J. (2013). H p-Means of S′ . In: Derivatives of Inner Functions. Fields Institute Monographs, vol 31. Springer, New York, NY. https://doi.org/10.1007/978-1-4614-5611-7_5
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