Generalized break divisors and triangulations of Lawrence polytopes

Abstract

Let G be a connected graph of genus g. The Picard group of degree g, Picg(G), is the set of equivalence classes of divisors on G of degree g, where two divisors are equivalent if one can be reached from the other through a sequence of chip-firing moves. We construct sets of representatives of the equivalence classes in Picg(G) by defining a function IG on the spanning trees of G from a triangulation of the Lawrence polytope of the cographic matroid M(G). Additionally, such sets of representatives correspond to stability conditions on the nodal curve dual to the graph G. We show that IG that are constructed from regular triangulations of Lawrence polytope correspond to classical stability conditions, which are induced by generic real-valued divisors on G.