Equivariant Ehrhart Theory of Hypersimplices

Abstract

We study the hypersimplex under the action of the symmetric group Sn by coordinate permutation. We prove that the evaluation of its equivariant H*-polynomial at 1 is the permutation character of decorated ordered set partitions under the natural action of Sn. This verifies a conjecture of Stapledon for the hypersimplex. To prove this result, we give a formula for the coefficients of the H*-polynomial. Additionally, for the (2,n)-hypersimplex, we use this formula to show that trivial character need not appear as a direct summand of a coefficient of the H*-polynomial, which gives a family of counterexamples to a different conjecture of Stapledon.

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