Benjamin Braun
Published 2015-05-27Version 1
Ehrhart theory is the study of sequences recording the number of integer points in non-negative integral dilates of rational polytopes. For a given lattice polytope, this sequence is encoded in a finite vector called the Ehrhart $h^*$-vector. Ehrhart $h^*$-vectors have connections to many areas of mathematics, including commutative algebra and enumerative combinatorics. In this survey we discuss what is known about unimodality for Ehrhart $h^*$-vectors and highlight open questions and problems.
Comments: Chapter for upcoming IMA volume Recent Trends in Combinatorics
Separation of integer points by a hyperplane under some weak notions of discrete convexity
Combinatorics and Genus of Tropical Intersections and Ehrhart Theory
An Invitation to Ehrhart Theory: Polyhedral Geometry and its Applications in Enumerative Combinatorics
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