Center-vortex semiclassics with non-minimal 't Hooft fluxes on R2× T2 and center stabilization at large N

Abstract

We consider the semiclassical description of confinement for 4d SU(N) Yang-Mills theory on small R2× T2 with non-minimal 't Hooft twist p with (N,p)=1. For this purpose, we construct the self-dual center vortex for non-minimal 't Hooft twists from the Kraan-van Baal-Lee-Lu-Yi (KvBLLY) monopoles by using the 3d Abelianized description of SU(N) gauge fields on R3× S1 with nontrivial holonomy backgrounds. This construction shows the self-dual vortex has (1) the fractional magnetic charge q/N with pq=1 mod N, (2) the fractional topological charge 1/N, and (3) the fractional instanton action SYM=8π2/(Ng2). The confinement vacua for NL 1 can be described by the dilute gas approximation of center vortices, and we give the semiclassical formula for the θ dependence and confining string tensions. We apply this result to understand the suitable choice of the twist p for center stabilization at large N. In particular, we test the proposal using the Fibonacci sequence, N=Fn+2 and p=Fn, suggested in studies of the twisted Eguchi-Kawai model, from the viewpoint of the 1-form and 0-form center symmetries.