Discontinuity in the asymptotic behavior of planar orthogonal polynomials under a perturbation of the Gaussian weight

Abstract

We consider the orthogonal polynomials, \Pn(z)\n=0,1,·s, with respect to the measure |z-a|2c e-N|z|2dA(z) supported over the whole complex plane, where a>0, N>0 and c>-1. We look at the scaling limit where n and N tend to infinity while keeping their ratio, n/N, fixed. The support of the limiting zero distribution is given in terms of certain "limiting potential-theoretic skeleton" of the unit disk. We show that, as we vary c, both the skeleton and the asymptotic distribution of the zeros behave discontinuously at c=0. The smooth interpolation of the discontinuity is obtained by the further scaling of c=e-η N in terms of the parameter η∈[0,∞).