Critical scaling in the matrix model on the Bethe tree

Abstract

The matrix model with a Bethe-tree embedding space (coinciding at large N with the Kazakov-Migdal ``induced QCD'' model KM) is investigated. We further elaborate the Riemann-Hilbert approach of Mig1 assuming certain holomorphic properties of the solution. The critical scaling (an edge singularity of the density) is found to be γstr = -1π D, for |D|<1, and γstr = -1π D2D-1, for D>1. Explicit solutions are constructed at D=12 and D=∞.

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