Matroids Are Immune to Braess’ Paradox

Author(s)

Fujishige, Satoru; Harks, Tobias; Peis, Britta; Zenklusen, Rico; Goemans, Michel X

Abstract

The famous Braess paradox describes the counterintuitive phenomenon in which, in certain settings, an increase of resources, such as a new road built within a congested network, may in fact lead to larger costs for the players in an equilibrium. In this paper, we consider general nonatomic congestion games and give a characterization of the combinatorial property of strategy spaces for which the Braess paradox does not occur. In short, matroid bases are precisely the required structure. We prove this characterization by two novel sensitivity results for convex separabl e optimization problems over polymatroid base polyhedra, which may be of independent interest. Keywords: nonatomic congestion games; Braess’ paradox; matroids; polymatroids

Date issued

2017-02

URI

http://hdl.handle.net/1721.1/115876

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

Mathematics of Operations Research

Publisher

Institute for Operations Research and the Management Sciences (INFORMS)

Citation

Fujishige, Satoru et al. “Matroids Are Immune to Braess’ Paradox.” Mathematics of Operations Research 42, 3 (August 2017): 745–761 © 2017 INFORMS

Version: Author's final manuscript

ISSN

0364-765X

1526-5471