Exact Potts/Tutte Polynomials for Hammock Chain Graphs

Abstract

We present exact calculations of the q-state Potts model partition functions and the equivalent Tutte polynomials for chain graphs comprised of m repeated hammock subgraphs He1,...,er connected with line graphs of length eg edges, such that the chains have open or cyclic boundary conditions (BC). Here, He1,...,er is a hammock (series-parallel) subgraph with r separate paths along ``ropes'' with respective lengths e1, ..., er edges, connecting the two end vertices. We denote the resultant chain graph as G\e1,...,er\,eg,m;BC. We discuss special cases, including chromatic, flow, and reliability polynomials. In the case of cyclic boundary conditions, the zeros of the Potts partition function in the complex q function accumulate, in the limit m ∞, onto curves forming a locus B, and we study this locus.

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