Adiabatic continuity in a partially reduced twisted Eguchi-Kawai model with one adjoint Dirac fermion

Abstract

We numerically investigate whether the center-symmetric confined phase of large-N SU(N) gauge theory with one adjoint Dirac fermion persists under spatial compactification on R3 × S1. To this end, we employ a partially reduced twisted Eguchi-Kawai (TEK) model on a 13 × L4 lattice with an adjoint Wilson fermion, and measure both the Polyakov loop around S1 and order parameters for volume independence in the reduced directions. For N=36, L4=2, b=0.30-0.46, and =0.03-0.16, we find that, with periodic boundary conditions, the Polyakov loop remains near zero in the light-fermion regime as the circle size is reduced. For the modified twist, the volume-independence order parameters are also consistent with zero in the explored region, supporting the validity of the partially reduced description. These results provide numerical evidence, within the reduced-model setup and parameter range studied, for an adiabatic-continuity scenario in which the confined phase is smoothly connected between large and small circles. By contrast, with antiperiodic boundary conditions, the Polyakov loop exhibits a clear deconfinement transition. We also discuss how this scenario is compatible with the anomaly constraints of the underlying four-dimensional theory. The symmetric twist is examined as a useful comparison, although its volume-independence properties appear less robust at the present value of N.