Exponents of Jacobians of Graphs and Regular Matroids
Abstract
Let G be a finite undirected multigraph with no self-loops. The Jacobian Jac(G) is a finite abelian group associated with G whose cardinality is equal to the number of spanning trees of G. There are only a finite number of biconnected graphs G such that the exponent of Jac(G) equals 2 or 3. The definition of a Jacobian can also be extended to regular matroids as a generalization of graphs. We prove that there are finitely many connected regular matroids M such that Jac(M) has exponent 2 and characterize all such matroids.
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