The unimodality of the Ehrhart δ-polynomial of the chain polytope of the zig-zag poset
Abstract
We prove the unimodality of the Ehrhart δ-polynomial of the chain polytope of the zig-zag poset, which was conjectured by Kirillov. First, based on a result due to Stanley, we show that this polynomial coincides with the W-polynomial for the zig-zag poset with some natural labeling. Then, its unimodality immediately follows from a result of Gasharov, which states that the W-polynomials of naturally labeled graded posets of rank 1 or 2 are unimodal.
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