Unimodular polytopes and column number bounds on polytopal totally unimodular matrices via Seymour's decomposition theorem

Abstract

We prove a sharp upper bound on the number of distinct columns of a totally unimodular matrix with column sums 1 improving upon Heller's classical bound. The proof uses Seymour's decomposition theorem. Such matrices are closely related to unimodular polytopes: lattice polytopes where the vertices of every full-dimensional subsimplex form an affine lattice basis. This is an interesting subclass of 0/1-polytopes and contains for instance edge polytopes of bipartite graphs. Our main result on totally unimodular matrices implies a sharp upper bound on the number of vertices of unimodular polytopes.

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