Tutte polynomials for regular oriented matroids

Abstract

The Tutte polynomial is a fundamental invariant of graphs and matroids. In this article, we define a generalization of the Tutte polynomial to oriented graphs and regular oriented matroids. To any regular oriented matroid N, we associate a polynomial invariant AN(q,y,z), which we call the A-polynomial. The A-polynomial has the following interesting properties among many others: 1. a specialization of AN gives the Tutte polynomial of the unoriented matroid underlying N, 2. when the oriented matroid N corresponds to an unoriented matroid (that is, when the elements of the ground set come in pairs with opposite orientations), the A-polynomial is equivalent to the Tutte polynomial of this unoriented matroid (up to a change of variables), 3. the A-polynomial AN detects, among other things, whether N is acyclic and whether N is totally cyclic. We explore various properties and specializations of the A-polynomial. We show that some of the known properties or the Tutte polynomial of matroids can be extended to the A-polynomial of regular oriented matroids. For instance, we show that a specialization of AN counts all the acyclic orientations obtained by reorienting some elements of N, according to the number of reoriented elements.