Strong Asymptotics of Planar Orthogonal Polynomials: Gaussian Weight Perturbed by Finite Number of Point Charges

Abstract

We consider the planar orthogonal polynomial pn(z) with respect to the measure supported on the whole complex plane e-N|z|2 Πj=1 |z-aj|2cj\, d A(z) where d A is the Lebesgue measure of the plane, N is a positive constant, \c1,·s,c\ are nonzero real numbers greater than -1 and \a1,·s,a\⊂ D\0\ are distinct points inside the unit disk. In the scaling limit when n/N = 1 and n ∞ we obtain the strong asymptotics of the polynomial pn(z). We show that the support of the roots converges to what we call the "multiple Szego curve," a certain connected curve having +1 components in its complement. We apply the nonlinear steepest descent method on the matrix Riemann-Hilbert problem of size (+1)×(+1).