Congruence conditions, parcels, and Tutte polynomials of graphs and matroids

Abstract

Let G be a matrix and M(G) be the matroid defined by linear dependence on the set E of column vectors of G. Roughly speaking, a parcel is a subset of pairs (f,g) of functions defined on E to an Abelian group A satisfying a coboundary condition (that f-g is a flow over A relative to G) and a congruence condition (that the size of the supports of f and g satisfy some congruence condition modulo an integer). We prove several theorems of the form: a linear combination of sizes of parcels, with coefficients roots of unity, equals an evaluation of the Tutte polynomial of M(G) at a point (λ-1,x-1) on the complex hyperbola (λ - 1)(x-1) = |A|.