Clock model interpolation and symmetry breaking in O(2) models

Abstract

The q-state clock model is a classical spin model that corresponds to the Ising model when q=2 and to the XY model when q∞. The integer-q clock model has been studied extensively and has been shown to have a single phase transition when q=2,3,4 and two phase transitions when q>4.We define an extended q-state clock model that reduces to the ordinary q-state clock model when q is an integer and otherwise is a continuous interpolation of the clock model to noninteger q. We investigate this class of clock models in 2D using Monte Carlo (MC) and tensor renormalization group (TRG) methods, and we find that the model with noninteger q has a crossover and a second-order phase transition. We also define an extended-O(2) model (with a parameter γ) that reduces to the XY model when γ=0 and to the extended q-state clock model when γ∞, and we begin to outline the phase diagram of this model. These models with noninteger q serve as a testbed to study symmetry breaking in situations corresponding to quantum simulators where experimental parameters can be tuned continuously.

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