SPARSE SIGNAL RECOVERY FROM QUADRATIC MEASUREMENTS VIA CONVEX PROGRAMMING

被引：137

作者：

Li, Xiaodong ^{[1
]}

Voroninski, Vladislav ^{[2
]}

机构：

[1] Stanford Univ, Dept Math, Stanford, CA 94305 USA

[2] Univ Calif Berkeley, Dept Math, Berkeley, CA 94709 USA

来源：

SIAM JOURNAL ON MATHEMATICAL ANALYSIS | 2013年 / 45卷 / 05期

关键词：

l1-minimization; trace minimization; Shor's SDP-relaxation; compressed sensing; PhaseLift; KKT condition; approximate dual certificate; golfing scheme; random matrices with IID rows; RECONSTRUCTION;

D O I：

10.1137/120893707

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

In this paper we consider a system of quadratic equations vertical bar < z(j), x > |(2) = b(j), j - 1,..., m, where x is an element of R-n is unknown while normal random vectors z is an element of R-n and quadratic measurements b I R are known. The system is assumed to be underdetermined, i.e., m < n. We prove that if there exists a sparse solution x, i.e., at most k components of x are nonzero, then by solving a convex optimization program, we can solve for x up to a multiplicative constant with high probability, provided that k <= O root m/log n). On the other hand, we prove that k <= O( log n root m) is necessary for a class of natural convex relaxations to be exact.

引用

页码：3019 / 3033

页数：15

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