Analyticity of the planar limit of a matrix model

Abstract

Using Chebyshev polynomials combined with some mild combinatorics, we provide a new formula for the analytical planar limit of a random matrix model with a one-cut potential V. For potentials V(x)=x2/2-Σn1anxn/n, as a power series in all an, the formal Taylor expansion of the analytic planar limit is exactly the formal planar limit. In the case V is analytic in infinitely many variables \an\n1 (on the appropriate spaces), the planar limit is also an analytic function in infinitely many variables and we give quantitative versions of where this is defined. Particularly useful in enumerative combinatorics are the gradings of V, Vt(x)=x2/2-Σn1antn/2xn/n and Vt(x)=x2/2-Σn3antn/2 -1xn/n. The associated planar limits F(t) as functions of t count planar diagram sorted by the number of edges respectively faces. We point out a method of computing the asymptotic of the coefficients of F(t) using the combination of the wzb method and the resolution of singularies. This is illustrated in several computations revolving around the important extreme potential Vt(x)=x2/2+(1-tx) and its variants. This particular example gives a quantitive and sharp answer to a conjecture of t'Hoofts which states that if the potential is analytic, the planar limit is also analytic.