Dual Frobenius manifolds of minimal gravity on disk

Abstract

Liouville field theory approach to 2-dimensional gravity possesses the duality (b b-1). The matrix counterpart of minimal gravity M(q,p) (q<p co-prime) is effectively described on Aq-1 Frobenius manifold, which may exhibit a similar duality p q, and allow a description on Ap-1 Frobenius manifold. We have positive results from the bulk one-point and the bulk-boundary two-point correlations on disk that the dual description of the Frobenius manifold works for the unitary series M(q, q+1). However, for the Lee-Yang series M(2, 2q+1) on disk the duality is checked only partially. The main difficulty lies in the absence of a canonical description of trace in the continuum limit.