RG flows of minimal W-algebra CFTs via non-invertible symmetries

Abstract

In this letter we study renormalization group (RG) flows between 2d conformal field theories enjoying extended higher-spin W-symmetry. We propose a new class of RG flows between the diagonal minimal models of WN-algebra that take the form WN(p,q)N(p,kp-q). These are obtained by matching the anomalies of the non-invertible symmetry Rep[SU(N)p-N] (and its discrete quotients) that is preserved by special relevant primary fields. This large non-invertible symmetry includes the familiar ZN symmetry of the minimal models. Our new flows furnish a significant generalization of the ones recently found in the case of Virasoro algebra, and include all previously known RG flows of WN. They have the remarkable property of being uniform in the rank N of the W-algebra.