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arxiv: 2402.11979 · v2 · pith:LZLGP4WV · submitted 2024-02-19 · math.CO

On a q-analogue of the Zeta polynomial of posets

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keywords polynomialq-analoguecoefficientszetaalwaysbehaviourchainscharacteristic
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We introduce a q-analogue of the classical Zeta polynomial of finite partially ordered sets, as a polynomial in one variable x with coefficients depending on the indeterminate q. We prove some properties of this polynomial invariant, including its behaviour with respect to duality, product and disjoint union. The leading term is a q-analogue of the number of maximal chains, but not always with non-negative coefficients. The value at q=0 turns out to be essentially the characteristic polynomial.

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Cited by 1 Pith paper

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  1. Polytopes and posets associated to preorders

    math.CO 2026-05 unverdicted novelty 6.0

    Preorder polytopes generalize arbor polytopes as lattice polytopes with a proven duality between Ehrhart polynomials and zeta polynomials of their lattice point posets, plus combinatorial volume interpretations and fo...