SINGULAR POINTS FOR THE SUM OF A SERIES OF EXPONENTIAL MONOMIALS

IF 0.5 Q3 MATHEMATICS Problemy Analiza-Issues of Analysis Pub Date : 2018-09-01 DOI:10.15393/J3.ART.2018.5310
O. Krivosheeva, A. Krivosheev
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引用次数: 3

Abstract

A problem of distribution of singular points for sums of series of exponential monomials on the boundary of its convergence domain is studied. The influence of a multiple sequence Λ = {λk, nk}k=1 of the series in the presence of singular points on the arc of the boundary, the ends of which are located at a certain distance R from each other, is investigated. In this regard, the condensation indices of the sequence and the relative multiplicity of its points are considered. It is proved that the finiteness of the condensation index and the zero relative multiplicity are necessary for the existence of singular points of the series sum on the R-arc. It is also proved that for one of the sequence classes Λ, these conditions give a criterion. Special cases of this result are the well-known results for the singular points of the sums of the Taylor and Dirichlet series, obtained by J. Hadamard, E. Fabry, G. Pólya, W.H.J. Fuchs, P. Malliavin, V. Bernstein and A. F. Leont’ev, etc.
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一系列指数单项式和的奇异点
研究了指数单项式级数和在收敛域边界上的奇异点分布问题。研究了在边界弧上存在两端相距一定距离R的奇点时,多重序列Λ = {Λ k, nk}k=1对序列的影响。在这方面,考虑了序列的凝聚指数和它的点的相对多重性。证明了r -弧上级数和的奇点存在的必要条件是凝结指数的有限性和相对多重性为零。还证明了对于其中一个序列类Λ,这些条件给出了一个判据。这个结果的特殊情况是由J. Hadamard, E. Fabry, G. Pólya, W.H.J. Fuchs, P. Malliavin, V. Bernstein和A. F. Leont 'ev等人得到的关于Taylor和Dirichlet级数和的奇点的著名结果。
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CiteScore
0.90
自引率
0.00%
发文量
20
审稿时长
20 weeks
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