English

Restricted invertibility revisited

Functional Analysis 2016-11-29 v2 Operator Algebras Spectral Theory

Abstract

Suppose that m,nNm,n\in \mathbb{N} and that A:RmRnA:\mathbb{R}^m\to \mathbb{R}^n is a linear operator. It is shown here that if k,rNk,r\in \mathbb{N} satisfy k<rrank(A)k<r\le \mathrm{\bf rank(A)} then there exists a subset σ{1,,m}\sigma\subseteq \{1,\ldots,m\} with σ=k|\sigma|=k such that the restriction of AA to RσRm\mathbb{R}^{\sigma}\subseteq \mathbb{R}^m is invertible, and moreover the operator norm of the inverse A1:A(Rσ)RmA^{-1}:A(\mathbb{R}^{\sigma})\to \mathbb{R}^m is at most a constant multiple of the quantity mr/((rk)i=rmsi(A)2)\sqrt{mr/((r-k)\sum_{i=r}^m \mathsf{s}_i(A)^2)}, where s1(A)sm(A)\mathsf{s}_1(A)\geqslant\ldots\geqslant \mathsf{s}_m(A) are the singular values of AA. This improves over a series of works, starting from the seminal Bourgain--Tzafriri Restricted Invertibility Principle, through the works of Vershynin, Spielman--Srivastava and Marcus--Spielman--Srivastava. In particular, this directly implies an improved restricted invertibility principle in terms of Schatten--von Neumann norms.

Keywords

Cite

@article{arxiv.1601.00948,
  title  = {Restricted invertibility revisited},
  author = {Assaf Naor and Pierre Youssef},
  journal= {arXiv preprint arXiv:1601.00948},
  year   = {2016}
}

Comments

Referee comments addressed. To appear in the collection of papers "Journey through Discrete Mathematics. A Tribute to Jiri Matousek" edited by Martin Loebl, Jaroslav Nesetril and Robin Thomas, due to be published by Springer

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