Direct Monte Carlo Computation of the 't~Hooft Partition Function

Abstract

The 't~Hooft partition function~ZtH[E;B] of an SU(N) gauge theory with the ZN 1-form symmetry is defined as the Fourier transform of the partition function~Z[B] with respect to the spatial-temporal components of the 't~Hooft flux~B. Its large volume behavior detects the quantum phase of the system. When the integrand of the functional integral is real-positive, the latter partition function~Z[B] can be numerically computed by a Monte Carlo simulation of the SU(N)/ZN gauge theory, just by counting the number of configurations of a specific 't~Hooft flux~B. We carry out this program for the SU(2) pure Yang--Mills theory with the vanishing θ-angle by employing a newly-developed hybrid Monte Carlo (HMC) algorithm (the halfway HMC) for the SU(N)/ZN gauge theory. The numerical result clearly shows that all non-electric fluxes are ``light'' as expected in the ordinary confining phase with the monopole condensate. Invoking the Witten effect on~ZtH[E;B], this also indicates the oblique confinement at~θ=2π with the dyon condensate.