Lefschetz Fixed Point Theorem and Lattice Points in Convex Polytopes

Abstract

A simple convex lattice polytope defines a torus-equivariant line bundle over a toric variety . Atiyah and Bott's Lefschetz fixed-point theorem is applied to the torus action on the d''-complex of and information is obtained about the lattice points of . In particular an explicit formula is derived, computing the number of lattice points and the volume of in terms of geometric data at its extreme points. We show this to be equivalent the results of Brion brion and give an elementary convex geometric interpretation by performing Laurent expansions similar to those of Ishida ishida.

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