Unimodular triangulations of sufficiently large dilations

Abstract

An integral polytope is a polytope whose vertices have integer coordinates. A unimodular triangulation of an integral polytope in Rd is a triangulation in which all simplices are integral with volume 1/d!. A classic result of Knudsen, Mumford, and Waterman states that for every integral polytope P, there exists a positive integer c such that cP has a unimodular triangulation. We strengthen this result by showing that for every integral polytope P, there exists c such that for every positive integer c' c, c'P admits a unimodular triangulation. This answers a longstanding question in the area.

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