The h*-polynomials of locally anti-blocking lattice polytopes and their γ-positivity
Abstract
A lattice polytope P ⊂ Rd is called a locally anti-blocking polytope if for any closed orthant Rd in Rd, P Rd is unimodularly equivalent to an anti-blocking polytope by reflections of coordinate hyperplanes. In the present paper, we give a formula for the h*-polynomials of locally anti-blocking lattice polytopes. In particular, we discuss the γ-positivity of the h*-polynomials of locally anti-blocking reflexive polytopes.
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