Article ID Journal Published Year Pages File Type
1895958 Journal of Geometry and Physics 2013 26 Pages PDF
Abstract

We describe an approach to the study of phase transitions in Potts models based on an estimate of the complexity of the locus of real zeros of the partition function, computed in terms of the classes in the Grothendieck ring of the affine algebraic varieties defined by the vanishing of the multivariate Tutte polynomial. We give completely explicit calculations for the examples of the chains of linked polygons and of the graphs obtained by replacing the polygons with their dual graphs. These are based on a deletion–contraction formula for the Grothendieck classes and on generating functions for splitting and doubling edges.

Related Topics
Physical Sciences and Engineering Mathematics Mathematical Physics
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