Self-dual binary codes from small covers and simple polytopes

Abstract

We explore the connection between simple polytopes and self-dual binary codes via the theory of small covers. We first show that a small cover Mn over a simple n-polytope Pn produces a self-dual code in the sense of Kreck-Puppe if and only if Pn is n-colorable and n is odd. Then we show how to describe such a self-dual binary code in terms of the combinatorial information of Pn. Moreover, we can define a family of binary codes Bk(Pn), 0≤ k≤ n, from an arbitrary simple n-polytope Pn. We will give some necessary and sufficient conditions for Bk(Pn) to be a self-dual code. A spinoff of our study of such binary codes gives some new ways to judge whether a simple n-polytope Pn is n-colorable in terms of the associated binary codes Bk(Pn). In addition, we prove that the minimum distance of the self-dual binary code obtained from a 3-colorable simple 3-polytope is always 4.