English

Extended formulations, non-negative factorizations and randomized communication protocols

Discrete Mathematics 2013-05-14 v3 Combinatorics

Abstract

An extended formulation of a polyhedron PP is a linear description of a polyhedron QQ together with a linear map π\pi such that π(Q)=P\pi(Q)=P. These objects are of fundamental importance in polyhedral combinatorics and optimization theory, and the subject of a number of studies. Yannakakis' factorization theorem [M. Yannakakis. Expressing combinatorial optimization problems by linear programs. {\em J. Comput. System Sci.}, 43(3):441--466 (1991)] provides a surprising connection between extended formulations and communication complexity, showing that the smallest size of an extended formulation of PP equals the nonnegative rank of its slack matrix SS. Moreover, Yannakakis also shows that the nonnegative rank of SS is at most 2c2^c, where cc is the complexity of any \emph{deterministic} protocol computing SS. In this paper, we show that the latter result can be strengthened when we allow protocols to be \emph{randomized}. In particular, we prove that the base-2 logarithm of the nonnegative rank of any nonnegative matrix equals the minimum complexity of a randomized communication protocol computing the matrix in expectation. Using Yannakakis' factorization theorem, this implies that the base-2 logarithm of the smallest size of an extended formulation of a polytope PP equals the minimum complexity of a randomized communication protocol computing the slack matrix of PP in expectation. We show that allowing randomization in the protocol can be crucial for obtaining small extended formulations. Specifically, we prove that for the spanning tree and perfect matching polytopes, small variance in the protocol forces large size in the extended formulation.

Keywords

Cite

@article{arxiv.1105.4127,
  title  = {Extended formulations, non-negative factorizations and randomized communication protocols},
  author = {Yuri Faenza and Samuel Fiorini and Roland Grappe and Hans Raj Tiwary},
  journal= {arXiv preprint arXiv:1105.4127},
  year   = {2013}
}

Comments

16 pages, 4 figures, 1 table

R2 v1 2026-06-21T18:10:14.338Z