Partition Function Zeros of a Restricted Potts Model on Lattice Strips and Effects of Boundary Conditions
Abstract
We calculate the partition function Z(G,Q,v) of the Q-state Potts model exactly for strips of the square and triangular lattices of various widths Ly and arbitrarily great lengths Lx, with a variety of boundary conditions, and with Q and v restricted to satisfy conditions corresponding to the ferromagnetic phase transition on the associated two-dimensional lattices. From these calculations, in the limit Lx ∞, we determine the continuous accumulation loci B of the partition function zeros in the v and Q planes. Strips of the honeycomb lattice are also considered. We discuss some general features of these loci.
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