English

Optimal switching sequence for switched linear systems

Optimization and Control 2020-02-17 v3 Computational Complexity Combinatorics Dynamical Systems

Abstract

We study the following optimization problem over a dynamical system that consists of several linear subsystems: Given a finite set of n×nn\times n matrices and an nn-dimensional vector, find a sequence of KK matrices, each chosen from the given set of matrices, to maximize a convex function over the product of the KK matrices and the given vector. This simple problem has many applications in operations research and control, yet a moderate-sized instance is challenging to solve to optimality for state-of-the-art optimization software. We propose a simple exact algorithm for this problem. Our algorithm runs in polynomial time when the given set of matrices has the oligo-vertex property, a concept we introduce in this paper for a finite set of matrices. We derive several sufficient conditions for a set of matrices to have the oligo-vertex property. Numerical results demonstrate the clear advantage of our algorithm in solving large-sized instances of the problem over one state-of-the-art global optimization solver. We also propose several open questions on the oligo-vertex property and discuss its potential connection with the finiteness property of a set of matrices, which may be of independent interest.

Keywords

Cite

@article{arxiv.1805.04677,
  title  = {Optimal switching sequence for switched linear systems},
  author = {Zeyang Wu and Qie He},
  journal= {arXiv preprint arXiv:1805.04677},
  year   = {2020}
}
R2 v1 2026-06-23T01:52:46.084Z