Range Sets And Bmo Norms of Analytic Functions
Canadian journal of mathematics, Tome 36 (1984) no. 4, pp. 747-755

Voir la notice de l'article provenant de la source Cambridge University Press

In this paper we are concerned with the space BMOA of analytic functions of bounded mean oscillation for Riemann surfaces, and it is shown that for any analytic function on a Riemann surface the area of its range set bounds the square of its BMO norm, from which it is seen as an immediate corollary that the space BMOA includes the space AD of analytic functions with finite Dirichlet integrals.Let R be an open Riemann surface which possesses a Green's function, i.e., R ∉ OG , and f b e an analytic function defined on R. The Dirichletintegral DR(f) = D(f) of f on R is defined by 1.1 and we denote by AD(R) the space of all functions f analytic on R for which D(f) < +∞.
Kobayashi, Shoji. Range Sets And Bmo Norms of Analytic Functions. Canadian journal of mathematics, Tome 36 (1984) no. 4, pp. 747-755. doi: 10.4153/CJM-1984-042-6
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[1] 1. Baernstein, A. II, Analytic functions of bounded mean oscillation. Aspects of contemporary complex analysis (Academic Press, 1980), 2–26. Google Scholar

[2] 2. Baernstein, A. II, Univalence and bounded mean oscillation, Michigan Math. J. 23 (1976), 217–223. Google Scholar

[3] 3. Carleson, L., Two remarks on H1 and BMO, Advances in Math. 22 (1976), 269–277. Google Scholar

[4] 4. Fefferman, C., Characterizations of bounded mean oscillation. Bull. Amer. Math. Soc. 77 (1971), 587–588. Google Scholar

[5] 5. Frostman, O., Potential d'equilibre et capacite des ensembles avec quelques applications a la theorie des fonctions, Medd. Lunds Univ. Mat. Sem. 3 (1955), 1–118. Google Scholar

[6] 6. Garnett, J., Bounded analytic functions (Academic Press, 1981). Google Scholar

[7] 7. Hayman, W. K. and Pommerenke, Ch., On analytic functions of bounded mean oscillation. Bull. London Math. Soc. 70 (1978), 219–224. Google Scholar

[8] 8. Heins, M., Hardy classes on Riemann surfaces. Lecture Notes in Math. 98 (Springer-Verlag, 1969). Google Scholar | DOI

[9] 9. Hille, E., Analytic function theory II (Chelsea, New York, 1962). Google Scholar

[10] 10. John, F. and Nirenberg, L., On functions of bounded mean oscillation, Comm. Pure Appl. Math 74 (1961), 415–426. Google Scholar

[11] 11. Kobayashi, S., On a classification of plane domains for BMOA, Kodai Math. J. 7 (1984), 111–119. Google Scholar

[12] 12. Kobayashi, S. and Suita, N., On subordination of subharmonic Junctions, Kodai Math. J. 3 (1980), 315–320. Google Scholar

[13] 13. Metzger, T. A., On BMOAfor Riemann surfaces, Can. J. Math. 18 (1981), 1255–1260. Google Scholar

[14] 14. Rudin, W., Analytic functions of classes H, Trans. Amer. Math. Soc. 78 (1955), 46–56. Google Scholar

[15] 15. Stegenga, D. A., A geometric condition which implies BMOA, Michigan Math. J. 27 (1980), 247–252. Google Scholar

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