Searching for new homogeneous sine-Gordon theories using T-duality symmetries

Abstract

The Homogeneous sine-Gordon (HSG) theories are integrable perturbations of Gk/U(1)rG coset CFTs, where G is a simple compact Lie group of rank rG and k>1 is an integer. Using their T-duality symmetries, we investigate the relationship between the different theories corresponding to a given coset, and between the different phases of a particular theory. Our results suggest that for G=SU(n) with n≥5 and E6 there could be two non-equivalent HSG theories associated to the same coset, one of which has not been considered so far.