FLOWS AND FERROMAGNETS
FLOWS AND FERROMAGNETS
The Tutte polynomial and its relatives play important roles in matroid theory, computational complexity, and models of statistical physics. They provide the natural way to count and relate a variety of objects defined on graphs. This chapter shows that they permit a representation of the two-point correlation function of a ferromagnetic Potts model on a graph G in terms of the flow polynomials of certain related random graphs. This representation extends to general Potts models the so-called random-current expansion for Ising models, and it amplifies the links between the Potts partition function and the Tutte polynomial.
Keywords: Tutte polynomial, Ising model, ferromagnetic Potts model, random-cluster model, Potts partition function
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