Tutte Short Exact Sequences of Graphs

Abstract

We associate two modules, the G-parking critical module and the toppling critical module, to an undirected connected graph G. The G-parking critical module and the toppling critical module are canonical modules (with suitable twists) of quotient rings of the well-studied G-parking function ideal and the toppling ideal, respectively. For each critical module, we establish a Tutte-like short exact sequence relating the modules associated to G, an edge contraction G/e and an edge deletion G e (e is a non-bridge). We obtain purely combinatorial consequences of Tutte short exact sequences. For instance, we reprove a theorem of Merino that the critical polynomial of a graph is an evaluation of its Tutte polynomial, and relate the vanishing of certain combinatorial invariants (the number of acyclic orientations on connected partition graphs satisfying a unique sink property) of G/e to the equality of the corresponding invariants of G and G e.