Confinement-Deconfinement Crossover in the Lattice CPN-1 Model

Abstract

The CPN-1 sigma model at finite temperature is studied using lattice Monte Carlo simulations on Ss1 × Sτ1 with radii Ls and Lτ, respectively, where the ratio of the circumferences is taken to be sufficiently large (Ls/Lτ 1) to simulate the model on R × S1. We show that the expectation value of the Polyakov loop undergoes a deconfinement crossover as Lτ is decreased, where the peak of the associated susceptibility gets sharper for larger N. We find that the global PSU(N)=SU(N)/ ZN symmetry remains unbroken at "quantum" and "classical" levels for the small and large Lτ, respectively: in the small Lτ region for finite N, the order parameter fluctuates extensively with its expectation value consistent with zero after taking an ensemble average, while in the large Lτ region the order parameter remains small with little fluctuations. We also calculate the thermal entropy and find that the degrees of freedom in the small Lτ regime are consistent with N-1 free complex scalar fields, thereby indicating a good agreement with the prediction from the large-N study for small Lτ.