Critical scaling in the N=1 Thirring Model in (2+1)d

Abstract

The Thirring model in 2+1d with N Dirac flavors can exhibit spontaneous U(2N)(N)(N) breaking through fermion - antifermion condensation in the limit m0. With no small parameter in play the symmetry-breaking dynamics is strongly-interacting and quantitative work requires a fermion formulation accurately capturing global symmetries. We present simulation results for N=1 obtained with Wilson kernel domain wall fermions on 163× Ls, with Ls=24,…,120. The Ls∞ extrapolation of the bilinear condensate as a function of coupling and bare mass is fitted to an empirical equation of state; the resulting critical exponents are significantly altered from previously obtained values, and for the first time resemble those emerging from analytic predictions based on approximate solutions to Schwinger-Dyson equations, consistent with a putative UV-stable renormalisation group fixed point. To address the non-perturbative issue of the value Nc below which such a fixed point exists we present preliminary results obtained with N=2.