Orthogonal polynomials in the spherical ensemble with two insertions

Abstract

We consider asymptotics of planar orthogonal polynomials Pn,N (where degPn,N=n) with respect to the weight |z-w|2NQ1(1+|z|2)N(1+Q0+Q1)+1, (Q0,Q1 > 0) in the whole complex plane. With n, N→∞ and N-n fixed, we obtain the strong asymptotics of the polynomials, asymptotics for the weighted L2 norm and the limiting zero counting measure. These results apply to the pre-critical phase of the underlying two-dimensional Coulomb gas system, when the support of the equilibrium measure is simply connected. Our method relies on specifying the mother body of the two-dimensional potential problem. It relies too on the fact that the planar orthogonality can be rewritten as a non-Hermitian contour orthogonality. This allows us to perform the Deift-Zhou steepest descent analysis of the associated 2× 2 Riemann-Hilbert problem.

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