Ultimate chromatic polynomials

AbstractWe outline an approach to enumeration problems which relies on the algebra of free abelian groups, giving as our main application a generalisation of the chromatic polynomial of a simple graph G. Our polynomial lies in the free abelian group generated by the poset K(G) of contractions of G, and reduces to the classical case after a simple substitution. Its main properties may be stated in terms of an evaluation homomorphism, one for each positive integer t, which when applied to the polynomial yields an explicit list of the colourings of G with t colours. Considering posets larger than K(G), and enriching the algebra accordingly, we extend the whole construction to incorporate the corresponding incidence Hopf algebras. The enriched polynomial reduces by a similar substitution to the umbral chromatic polynomial of G

Ultimate Chromatic Polynomials

We outline an approach to enumeration problems which relies on the algebra of free abelian groups, giving as our main application a generalisation of the chromatic polynomial of a simple graph G. Our polynomial lies in the free abelian group generated by the poset K(G) of contractions of G, and reduces to the classical case after a simple substitution. Its main properties may be stated in terms of an evaluation homomorphism, one for each positive integer t, which when applied to the polynomial yields an explicit list of the colourings of G with t colours. Considering posets larger than K(G), and enriching the algebra accordingly, we extend the whole construction to incorporate the corresponding incidence Hopf algebras. The enriched polynomial reduces by a similar substitution to the umbral chromatic polynomial of G. 1 Introduction Given a finite set S of combinatorially significant objects, the basic aim of enumeration theory is to investigate the cardinality jSj of S. The most desir..