Cauchy–Hadamard theorem for exponential series
DOI:
https://doi.org/10.13108/2014-6-1-71Keywords:
convex domains, series of exponentials, Cauchy–Hadamard formula.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. The study of the properties of this ring allows us to obtain the results on solvability of non-homogeneous systems of convolution equations.Downloads
Published
20.03.2014
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