On Generalized h--Vectors of Rational Polytopes with a Symmetry of Prime Order

Abstract

We prove tight lower bounds for the coefficients of the generalized h-vector of a rational polytope with a symmetry of prime order that is fixed--point--free on the boundary. These bounds generalize results of R.~Stanley and R.~Adin for the h--vector of a simplicial rational polytope with a central symmetry or a symmetry of prime order respectively.

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