Entanglement-entropy study of phase transitions in six-state clock model

Abstract

The Berezinskii-Kosterlitz-Thouless (BKT) transitions of the six-state clock model on the square lattice are investigated by means of the corner-transfer matrix renormalization group method. A classical analog of the entanglement entropy S( L, T ) is calculated for L × L square system up to L = 129, as a function of temperature T. The entropy exhibits a peak at T = T*~( L ), where the temperature depends on both L and the boundary conditions. Applying the finite-size scaling to T*~( L ) and assuming presence of the BKT transitions, the two distinct phase-transition temperatures are estimated to be T1~ = 0.70 and T2~ = 0.88. The results are in agreement with earlier studies. It should be noted that no thermodynamic functions have been used in this study.