Categorification of Chromatic, Dichromatic and Penrose Polynomials

TL;DR

This paper develops a categorification framework for chromatic, dichromatic, and Penrose polynomials, linking polynomial evaluations to homology theories and algebraic structures, thus providing new insights into graph invariants.

Contribution

It introduces novel categorifications of these polynomials, connecting polynomial evaluations to bigraded homology theories and algebraic structures on colors.

Findings

Coefficients of Potts partition function relate to Euler characteristics of homology.

Dichromatic polynomial decomposed into impropriety coloring polynomials.

Categorification of coloring evaluations links to chain complexes and algebraic structures.

Abstract

This paper discusses ways to categorify chromatic, dichromatic and Penrose polynomials, including categorifications of integer evaluations of chromatic polynomials. We show that with an appropriate choice of variables the coefficients of the Potts partition function at different energy levels are given by Euler characteristics of appropriate parts of a bigraded homology theory associated with the model. In the case of the dichromatic polynomial for graphs, we show that the two variable polynomial can be seen as a sum of powers of one variable multiplied by coefficients that are "impropriety" coloring polynomials for the underlying graph. An impropriety polynomial $C_{G}^{i}(n)$ counts the number of colorings in $n$ colors of the graph that are not proper at a given number $i$ of edges in the graph. The last section of the paper categorifies coloring evaluations rather than coloring polynomials. We then obtain a range of possible chain complexes and homology theories such that the chromatic evaluation is equal to the Euler characteristic of the homology. The freedom of choice in making such chain complexes is related to possible associative algebra structures on the set of colors.