Reproducing kernel of the space Rt(K,μ)

Abstract

For 1 t < ∞ , a compact subset K of the complex plane C, and a finite positive measure μ supported on K, Rt(K, μ) denotes the closure in Lt (μ ) of rational functions with poles off K. Let be a connected component of the set of analytic bounded point evaluations for Rt(K, μ). In this paper, we examine the behavior of the reproducing kernel of Rt(K, μ) near the boundary ∂ T, assuming that μ (∂ T ) > 0, where T is the unit circle.