A curved Brunn-Minkowski inequality for the symmetric group

Author(s)

Neeranartvong, Weerachai; Novak, Jonathan; Sothanaphan, Nat

Abstract

In this paper, we construct an injection A×B→M×M from the product of any two nonempty subsets of the symmetric group into the square of their midpoint set, where the metric is that corresponding to the conjugacy class of transpositions. If AA and BB are disjoint, our construction allows to inject two copies of A×B into M×M. These injections imply a positively curved Brunn-Minkowski inequality for the symmetric group analogous to that obtained by Ollivier and Villani for the hypercube. However, while Ollivier and Villani's inequality is optimal, we believe that the curvature term in our inequality can be improved. We identify a hypothetical concentration inequality in the symmetric group and prove that it yields an optimally curved Brunn-Minkowski inequality

Date issued

2016-02

URI

http://hdl.handle.net/1721.1/109449

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

Electronic Journal of Combinatorics

Publisher

European Mathematical Information Service (EMIS)

Citation

Neeranartvong, Weerachai, Jonathan Novak and Nat Sothanaphan. "A Curved Brunn Minkowski Inequality for the Symmetric Group." The Electronic Journal of Combinatorics 23.1 (2016): n. pag.

Version: Final published version

ISSN

1077-8926

1097-1440