English

Stability of Localized Operators

Functional Analysis 2010-05-04 v1

Abstract

Let p,1p\ell^p, 1\le p\le \infty, be the space of all pp-summable sequences and CaC_a be the convolution operator associated with a summable sequence aa. It is known that the p\ell^p- stability of the convolution operator CaC_a for different 1p1\le p\le \infty are equivalent to each other, i.e., if CaC_a has p\ell^p-stability for some 1p1\le p\le \infty then CaC_a has q\ell^q-stability for all 1q1\le q\le \infty. In the study of spline approximation, wavelet analysis, time-frequency analysis, and sampling, there are many localized operators of non-convolution type whose stability is one of the basic assumptions. In this paper, we consider the stability of those localized operators including infinite matrices in the Sj\"ostrand class, synthesis operators with generating functions enveloped by shifts of a function in the Wiener amalgam space, and integral operators with kernels having certain regularity and decay at infinity. We show that the p\ell^p- stability (or LpL^p-stability) of those three classes of localized operators are equivalent to each other, and we also prove that the left inverse of those localized operators are well localized.

Keywords

Cite

@article{arxiv.0811.1612,
  title  = {Stability of Localized Operators},
  author = {Chang Eon Shin and Qiyu Sun},
  journal= {arXiv preprint arXiv:0811.1612},
  year   = {2010}
}
R2 v1 2026-06-21T11:40:12.361Z