Markovian protocols and an upper bound on the extension complexity of the matching polytope

Abstract

This paper investigates the extension complexity of polytopes by exploiting the correspondence between non-negative factorizations of slack matrices and randomized communication protocols. We introduce a geometric characterization of extension complexity based on the width of Markovian protocols, as a variant of the framework introduced by Faenza et al. This enables us to derive a new upper bound of O(n3· 1.5n) for the extension complexity of the matching polytope Pmatch(n), improving upon the standard 2n-bound given by Edmonds' description. Additionally, we recover Goemans' compact formulation for the permutahedron using a one-round protocol based on sorting networks.