Interpolation by Series of Exponential Functions Whose Exponents Are Condensed in a Certain Direction

被引:0
作者
Merzlyakov S.G. [1 ]
Popenov S.V. [1 ]
机构
[1] Institute of Mathematics with Computing Center, Ufa Federal Research Center of the Russian Academy of Sciences, Ufa
来源
Journal of Mathematical Sciences | 2021年 / 257卷 / 3期
关键词
30D05; 30E05; Cauchy problem; convolution operator; exponent of exponential function; interpolation; limit direction of exponents; Radon integral; series of exponential functions; Vallée Poussin problem;
D O I
10.1007/s10958-021-05487-z
中图分类号
学科分类号
摘要
For complex interpolation nodes, we study the problem of interpolation by series of exponential functions whose exponents form a set, which is condensed at infinity in a certain direction. We obtain a criterion for all sets of nodes from a special class. For arbitrary sets of nodes, we obtain a necessary condition for the solvability of a more general problem of interpolation by functions that can be represented as Radon integrals of an exponential function over a set of exponents. The paper also contains well-known results on interpolation, which, in particular, allow studying the multipoint holomorphic Vallée Poussin problem for convolution operators. © 2021, Springer Science+Business Media, LLC, part of Springer Nature.
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页码:334 / 352
页数:18
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