Bivariate Chromatic Polynomials of Mixed Graphs
Abstract
The bivariate chromatic polynomial G(x,y) of a graph G = (V, E), introduced by Dohmen-P\"onitz-Tittmann (2003), counts all x-colorings of G such that adjacent vertices get different colors if they are y. We extend this notion to mixed graphs, which have both directed and undirected edges. Our main result is a decomposition formula which expresses G(x,y) as a sum of bivariate order polynomials (Beck-Farahmand-Karunaratne-Zuniga Ruiz 2020), and a combinatorial reciprocity theorem for G(x,y).
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