The asymptotic behaviour of recurrence coefficients for orthogonal polynomials with varying exponential weights

Abstract

We consider orthogonal polynomials \pn,N(x)\n=0∞ on the real line with respect to a weight w(x)=e-NV(x) and in particular the asymptotic behaviour of the coefficients an,N and bn,N in the three term recurrence x πn,N(x) = πn+1,N(x) + bn,N πn,N(x) + an,N πn-1,N(x). For one-cut regular V we show, using the Deift-Zhou method of steepest descent for Riemann-Hilbert problems, that the diagonal recurrence coefficients an,n and bn,n have asymptotic expansions as n ∞ in powers of 1/n2 and powers of 1/n, respectively.