English

MIP and Set Covering approaches for Sparse Approximation

Discrete Mathematics 2020-09-15 v1 Optimization and Control

Abstract

The Sparse Approximation problem asks to find a solution xx such that yHx<α||y - Hx|| < \alpha, for a given norm ||\cdot||, minimizing the size of the support x0:=#{j  xj0}||x||_0 := \#\{j \ |\ x_j \neq 0 \}. We present valid inequalities for Mixed Integer Programming (MIP) formulations for this problem and we show that these families are sufficient to describe the set of feasible supports. This leads to a reformulation of the problem as an Integer Programming (IP) model which in turn represents a Minimum Set Covering formulation, thus yielding many families of valid inequalities which may be used to strengthen the models up. We propose algorithms to solve sparse approximation problems including a branch \& cut for the MIP, a two-stages algorithm to tackle the set covering IP and a heuristic approach based on Local Branching type constraints. These methods are compared in a computational experimentation with the goal of testing their practical potential.

Keywords

Cite

@article{arxiv.2009.06312,
  title  = {MIP and Set Covering approaches for Sparse Approximation},
  author = {Diego Delle Donne and Matthieu Kowalski and Leo Liberti},
  journal= {arXiv preprint arXiv:2009.06312},
  year   = {2020}
}

Comments

in Proceedings of iTWIST'20, Paper-ID: 26, Nantes, France, December, 2-4, 2020

R2 v1 2026-06-23T18:30:59.746Z