Pedro D. Alvarez, Fabrizio Canfora, Sebastian A. Reyes, Simon Riquelme
Published 2009-12-23, updated 2012-05-07Version 4
We compute the partition function of the Potts model with arbitrary values of $q$ and temperature on some strip lattices. We consider strips of width $L_y=2$, for three different lattices: square, diced and `shortest-path' (to be defined in the text). We also get the exact solution for strips of the Kagome lattice for widths $L_y=2,3,4,5$. As further examples we consider two lattices with different type of regular symmetry: a strip with alternating layers of width $L_y=3$ and $L_y=m+2$, and a strip with variable width. Finally we make some remarks on the Fisher zeros for the Kagome lattice and their large q-limit.
Comments: 17 pages, 19 figures. v2 typos corrected, title changed and references, acknowledgements and two further original examples added. v3 one further example added. v4 final version
Journal: Eur. Phys. J. B (2012) 85: 99
Exact results for the zeros of the partition function of the Potts model on finite lattices
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