Monte Carlo study of duality and the Berezinskii-Kosterlitz-Thouless phase transitions of the two-dimensional q-state clock model in flow representations

Abstract

The two-dimensional q-state clock model for q ≥ 5 undergoes two Berezinskii-Kosterlitz-Thouless (BKT) phase transitions as temperature decreases. Here we report an extensive worm-type simulation of the square-lattice clock model for q=5--9 in a pair of flow representations, from the high- and low-temperature expansions, respectively. By finite-size scaling analysis of susceptibility-like quantities, we determine the critical points with a precision improving over the existing results. Due to the dual flow representations, each point in the critical region is observed to simultaneously exhibit a pair of anomalous dimensions, which are η1=1/4 and η2 = 4/q2 at the two BKT transitions. Further, the approximate self-dual points β sd(L), defined by the stringent condition that the susceptibility like quantities in both flow representations are identical, are found to be nearly independent of system size L and behave as β sd q/2π asymptotically at the large-q limit. The exponent η at β sd is consistent with 1/q within statistical error as long as q ≥ 5. Based on this, we further conjecture that η(β sd) = 1/q holds exactly and is universal for systems in the q-state clock universality class. Our work provides a vivid demonstration of rich phenomena associated with the duality and self-duality of the clock model in two dimensions.

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