This is a preview of subscription content, log in via an institution to check access.
References
M. G. Khaplanov, “A matrix criterion for a basis in the space of analytic functions,” Dokl. Akad. Nauk SSSR,8, No. 2, 177–180 (1951).
Yu. F. Korobeînik, “Necessary and sufficient criterion for a basis to possess a quasipower character,” in: Collection of the Student Works [in Russian], Rostovsk. Univ., Rostov-on-Don, 1957, pp. 65–69.
M. M. Dragilev, “Canonical form of a basis of the space of analytic functions,” Uspekhi Mat. Nauk,15, No. 2, 181–188 (1960).
M. M. Dragilev, “On isomorphic representation for the pairs of embedded spaces of analytic functions,” in: Linear Topological Spaces and Complex Analysis [Preprint;3], Ankara (1997).
M. M. Dragilev, “On jointly regular bases for Köthe spaces,” Mat. Zametki,19, No. 1, 115–122 (1976).
A. I. Markushevich, The Theory of Analytic Functions [in Russian], Gostekhteorizdat, Moscow and Leningrad (1950).
M. M. Dragilev, “To the question of existence of a general basis for the embedded spaces of analytic functions,” Dokl. Akad. Nauk SSSR,145, No. 2, 263–265 (1962).
V. D. Erokhin, “On conformal transformations of rings and a principal basis for the space of analytic functions in an elementary neighborhood about an arbitrary continuum,” Dokl. Akad. Nauk SSSR,120, No. 4, 689–698 (1958).
V. P. Zakharyuta and S. N. Kadampatta, “On existence of an extendible basis for the spaces of analytic functions in a compact set,” Mat. Zametki,27, No. 3, 334–340 (1980).
N. S. Manzhikova, “On extendible bases,” in: Differential and Integral Equations and Complex Analysis [in Russian], Èlista 1988, pp. 76–82.
T. V. Nguen, “Bases de Schauder dans certaines espaces de functions holomorphes,” Ann. Inst. Fourier (Grenoble),22, No. 2, 169–253 (1972).
N. S. Nadbitova and V. P. Zakharyuta, “Maximal plurisubharmonic Green functions for compact sets inC n and extendible bases,” submitted to VINITI on 1983, No. 1780–83.
N. S. Nadbitova, “Maximal plurisubharmonic Green functions for compact sets inC n and their applications to extendible bases,” in: Mathematical Analysis and Its Applications [in Russian], Rostovsk. Univ., Rostov-on-Don, 1985, pp. 100–107.
V. P. Zakharyuta, “Extendible bases for the spaces of analytic functions in one and several variables,” Sibirsk. Mat. Zh.,8, No. 1, 204–216 (1967).
V. P. Zakharyuta, “On bases and isomorphisms of the spaces of analytic functions of several variables in complex domains,” in: The Theory of Functions, Functional Analysis and Their Applications [in Russian], Vishcha Shkola, Khar'kov, 1967,5, pp. 57–76.
V. P. Zakharyuta, “Isomorphisms of spaces of analytic functions,” Dokl. Akad. Nauk SSSR,252, 631–634 (1980).
V. P. Zakharyuta, Spaces of Analytic Functions and Maximal Plurisubharmonic Functions [in Russian], Dis. Dokt. Fiz.-Mat. Nauk, Rostov-on-Don (1984).
V. P. Zahariuta, “Spaces of analytic functions and complex potential theory,” in: Linear Topological Spaces and Complex Analysis, Ankara, 1994,1, pp. 78–146.
Additional information
The research was financially supported by the Russian Foundation for Basic Research (Grant 97-01-00-215).
Rostov-on-Don. Translated fromSibirskiî Matematicheskiî Zhurnal, Vol. 40, No. 1, pp. 69–74, January–February, 1999.
Rights and permissions
About this article
Cite this article
Dragilev, M.M. On common bases for the spacesA(G) and\(\bar A(\bar G)^{\dag )} \) . Sib Math J 40, 57–61 (1999). https://doi.org/10.1007/BF02674290
Received:
Issue Date:
DOI: https://doi.org/10.1007/BF02674290