Gradient Support Projection Algorithm for Affine Feasibility Problem with Sparsity and Nonnegativity
Abstract
Let be a real measurement matrix and be an observations vector. The affine feasibility problem with sparsity and nonnegativity ( for short) is to find a sparse and nonnegative vector with if such exists. In this paper, we focus on establishment of optimization approach to solving the . By discussing tangent cone and normal cone of sparse constraint, we give the first necessary optimality conditions, -Stability, T-Stability and N-Stability, and the second necessary and sufficient optimality conditions for the related minimization problems with the . By adopting Armijo-type stepsize rule, we present a framework of gradient support projection algorithm for the and prove its full convergence when matrix is -regular. By doing some numerical experiments, we show the excellent performance of the new algorithm for the without and with noise.
Cite
@article{arxiv.1406.7178,
title = {Gradient Support Projection Algorithm for Affine Feasibility Problem with Sparsity and Nonnegativity},
author = {Lili Pan and Naihua Xiu and Shenglong Zhou},
journal= {arXiv preprint arXiv:1406.7178},
year = {2014}
}