Minimal Models RG flows: non-invertible symmetries & non-perturbative description

Abstract

In this letter we continue the investigation of RG flows between minimal models that are protected by non-invertible symmetries. RG flows leaving unbroken a subcategory of non-invertible symmetries are associated with anomaly-matching conditions that we employ systematically to map the space of flows between Virasoro Minimal models beyond the Z2-symmetric proposed recently in the literature. We introduce a family of non-linear integral equations that appear to encode the exact finite-size, ground-state energies of these flows, including non-integrable cases, such as the recently proposed M(k q + I,q) M(k q - I,q). Our family of NLIEs encompasses and generalises the integrable flows known in the literature: φ(1,3), φ(1,5), φ(1,2) and φ(2,1). This work uncovers a new interplay between exact solvability and non-invertible symmetries. Furthermore, our non-perturbative description provides a non-trivial test for all the flows conjectured by anomaly matching conditions, but so far not-observed by other means.