Transversal polynomial of r-fold covers

Abstract

We explore the interplay between algebraic combinatorics and algorithmic problems in graph theory by defining a polynomial with connections to correspondence colouring (also known as DP-colouring), a recent generalization of list-colouring, and the Unique Games Conjecture. Like the chromatic polynomial of a graph, we are able to evaluate this polynomial at a point, despite the complexity of computing this polynomial. We construct a cover of a graph X by blowing up each vertex to a set of r vertices and joining each pair of sets corresponding to adjacent vertices by a matching with r edges. To each cover Y of X we associate a polynomial (Y,t), called the transversal polynomial. The coefficient tk of (Y,t) is the number of k-edge induced subgraphs of Y whose vertex set is a transversal of the set system given by the blown-up vertices. We show that (Y,t) satisfies a contraction-deletion formula, and that if n=|VX| and the cover has index r, then (Y,-(r-1)) 0 rn.