Exact finite-size corrections in the dimer model on a cylinder

Abstract

The exact finite-size corrections to the free energy F of the dimer model on lattice M × N with cylindrical boundary conditions have been derived for three cases where the lattice is completely covered by dimers: M = 2M, N = 2N; M = 2M - 1, N = 2N; and M = 2M, N = 2N - 1. For these types of cylinders, ratios rp() of the pth coefficient of F have been calculated for the infinitely long cylinder ( M → ∞) and infinitely long strip ( N → ∞) at varying aspect ratios. As in previous studies of the dimer model on the rectangular lattice with free boundary conditions and for the Ising model with Brascamp-Kunz boundary conditions, the limiting values p ∞ exhibit abrupt anomalous behaviour of ratios rp() at certain values of . These critical values of and the limiting values of the finite-size expansion coefficient ratios vary between the different models.

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