The free energy of the Potts model: from the continuous to the first-order transition region
Abstract
We present a large q expansion of the 2d q-states Potts model free energies up to order 9 in 1/q. Its analysis leads us to an ansatz which, in the first-order region, incorporates properties inferred from the known critical regime at q=4, and predicts, for q>4, the n th energy cumulant scales as the power (3 n /2-2) of the correlation length. The parameter-free energy distributions reproduce accurately, without reference to any interface effect, the numerical data obtained in a simulation for q=10 with lattices of linear dimensions up to L=50. The pure phase specific heats are predicted to be much larger, at q≤10, than the values extracted from current finite size scaling analysis of extrema. Implications for safe numerical determinations of interface tensions are discussed.
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