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一种求解线性方程组最稀疏解的新计算方法

A New Computational Method for the Sparsest Solutions to Systems of Linear Equations

SIAM Journal on Optimization · 2015
被引 24
ABS 3

中文导读

本文建立欠定线性方程组最稀疏解与加权ℓ1最小化问题的联系,提出一种新的重加权ℓ1算法,通过在对偶空间计算权重来寻找最稀疏解,实验表明该方法优于传统ℓ1最小化。

Abstract

The connection between the sparsest solution to an underdetermined system of linear equations and the weighted $\ell_1$-minimization problem is established in this paper. We show that seeking the sparsest solution to a linear system can be transformed to searching for the densest slack variable of the dual problem of weighted $\ell_1$-minimization with all possible choices of nonnegative weights. Motivated by this fact, a new reweighted $\ell_1$-algorithm for the sparsest solutions of linear systems, going beyond the framework of existing sparsity-seeking methods, is proposed in this paper. Unlike existing reweighted $\ell_1$-methods that are based on the weights defined directly in terms of iterates, the new algorithm computes a weight in dual space via certain convex optimization and uses such a weight to locate the sparsest solutions. It turns out that the new algorithm converges to the sparsest solutions of linear systems under some mild conditions that do not require the uniqueness of the sparsest solutions. Empirical results demonstrate that this new computational method remarkably outperforms $\ell_1$-minimization and stands as one of the very efficient sparsity-seeking algorithms for the sparsest solutions of systems of linear equations.

数学优化稀疏表示线性系统