CAUCHY-HADAMARD THEOREM FOR EXPONENTIAL SERIES

IF 0.5 Q3 MATHEMATICS Ufa Mathematical Journal Pub Date : 2014-01-01 DOI:10.13108/2014-6-1-71
S. G. Merzlyakov
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引用次数: 1

Abstract

In this paper we study the connection between the growth of coefficients of an exponentials series with its convergence domain in finite-dimensional real and complex spaces. Among the first results of the subject is the well-known Cauchy-Hadamard formula. We obtain exact conditions on the exponentials and a convex region in which there is a generalization of the Cauchy-Hadamard theorem. To the sequence of coefficients of exponential series we associate a space of sequences forming a commutative ring with unit. A study of the properties of this ring allows us to obtain the results on solvability of non- homogeneous systems of convolution equations.
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指数级数的柯西-哈达玛定理
本文研究了有限维实空间和复空间中指数级数的系数增长与其收敛域之间的联系。这门学科最早的结果之一是著名的柯西-阿达玛公式。我们得到了指数的精确条件,并得到了柯西-阿达玛尔定理在凸区域的推广。对于指数级数的系数序列,我们将构成交换环的序列空间与单位联系起来。通过对该环性质的研究,得到了非齐次卷积方程组的可解性的一些结果。
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Ufa Mathematical Journal
Ufa Mathematical Journal MATHEMATICS-
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1.10
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