Phase Structure of d=2+1 Compact Lattice Gauge Theories and the Transition from Mott Insulator to Fractionalized Insulator

Abstract

Large-scale Monte Carlo simulations are employed to study phase transitions in the three-dimensional compact abelian Higgs model in adjoint representations of the matter field, labelled by an integer q, for q=2,3,4,5. We also study various limiting cases of the model, such as the Zq lattice gauge theory, dual to the 3DZq spin model, and the 3DXY spin model which is dual to the Zq lattice gauge theory in the limit q ∞. We have computed the first, second, and third moments of the action to locate the phase transition of the model in the parameter space (β,), where β is the coupling constant of the matter term, and is the coupling constant of the gauge term. We have found that for q=3, the three-dimensional compact abelian Higgs model has a phase-transition line βc() which is first order for below a finite tricritical value tri, and second order above. We have found that the β=∞ first order phase transition persists for finite β and joins the second order phase transition at a tricritical point (βtri, tri) = (1.23 0.03, 1.73 0.03). For all other integer q ≥ 2 we have considered, the entire phase transition line βc() is critical.

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