Bivariate Order Polynomials
Abstract
Motivated by Dohmen-P\"onitz-Tittmann's bivariate chromatic polynomial G(x,y), which counts all x-colorings of a graph G such that adjacent vertices get different colors if they are y, we introduce a bivarate version of Stanley's order polynomial, which counts order preserving maps from a given poset to a chain. Our results include decomposition formulas in terms of linear extensions, a combinatorial reciprocity theorem, and connections to bivariate chromatic polynomials.
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