Asymptotics of Bergman polynomials for domains with reflection-invariant corners

Abstract: We study the asymptotic behavior of the Bergman orthogonal polynomials $(p_n)_{n=0}^{\infty}$ for a class of bounded simply connected domains $D$. The class is defined by the requirement that conformal maps $\varphi$ of $D$ onto the unit disk extend analytically across the boundary $L$ of $D$, and that $\varphi'$ has a finite number of zeros $z_1,\ldots, z_q$ on $L$. The boundary $L$ is then piecewise analytic with corners at the zeros of $\varphi'$. A result of Stylianopoulos implies that a Carleman-type strong asymptotic formula for $p_n$ holds on the exterior domain $\mathbb{C}\setminus\overline{D}$. We prove that the same formula remains valid across $L\setminus{z_1,\ldots,z_q}$ and on a maximal open subset of $D$. As a consequence, the only boundary points that attract zeros of $p_n$ are the corners. This is in stark contrast to the case when $\varphi$ fails to admit an analytic extension past $L$, since when this happens the zero counting measure of $p_n$ is known to approach the equilibrium measure for $L$ along suitable subsequences.