Morrey型空间中具有线性相位的正弦和余弦系统的基性

Q4 Mathematics

Communications in Mathematical Analysis Pub Date : 2020-11-01 DOI:10.22130/SCMA.2020.121797.756

Fidan Seyidova

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引用次数: 0

摘要

在这个工作系统中考虑sin $sin左(n+右)t，，， n=1,2, ldots，$和cos $cos左(n-右)t，，， n=0,1,2, ldots，$，其中R-$中的$是一个实参数。考虑了Morrey空间$L^{p,alpha} left(0,pi右)$的连续函数密集的子空间$M^{p,alpha} left(0,pi右)$。关于子空间$M^{p，}左(0，右)$，$1中参数$ β $的完备性、极小性和基性的判据

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On the Basicity of Systems of Sines and Cosines with a Linear Phase in Morrey-Type Spaces

In this work systems of sines $sin left(n+beta right)t,, , n=1,2, ldots,$ and cosines $cos left(n-beta right)t,, , n=0,1,2, ldots,$ are considered, where $beta in R-$is a real parameter. The subspace $M^{p,alpha } left(0,pi right)$ of the Morrey space $L^{p,alpha } left(0,pi right)$ in which continuous functions are dense is considered. Criterion for the completeness, minimality and basicity of these systems with respect to the parameter $beta $ in the subspace $M^{p,alpha } left(0,pi right)$, $1

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Communications in Mathematical Analysis Mathematics-Applied Mathematics

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