Double scaling limits of random matrices and minimal (2m,1) models: the merging of two cuts in a degenerate case

Abstract

In this article, we show that the double scaling limit correlation functions of a random matrix model when two cuts merge with degeneracy 2m (i.e. when y x2m for arbitrary values of the integer m) are the same as the determinantal formulae defined by conformal (2m,1) models. Our approach follows the one developed by Berg\`ere and Eynard in BergereEynard and uses a Lax pair representation of the conformal (2m,1) models (giving Painlev\'e II integrable hierarchy) as suggested by Bleher and Eynard in BleherEynard. In particular we define Baker-Akhiezer functions associated to the Lax pair to construct a kernel which is then used to compute determinantal formulae giving the correlation functions of the double scaling limit of a matrix model near the merging of two cuts.