Aleman-Richter-Sundberg's Theorem On Pt(μ )-Spaces

Abstract

Let be a finite complex measure with support in D and let C denote the Cauchy transform of . Suppose that annihilates polynomials in complex variable z and |∂ D = hm, where m is the normalized Lebesgue measure on ∂ D. We show that, for ε0 > 0, m-almost all eiθ∈ ∂ D, and a > 0, when r tends to 1, there exists Er ⊂ B(reiθ, 1-r4) with analytic capacity γ (Er) < ε0 1-r4 such that | C (λ) - e-iθh(eiθ) | a area-almost all λ ∈ B (reiθ, 1-r4 ) Er . Using this result, we provide an alternative proof of Aleman-Richter-Sundberg's Theorem on nontangential limits in Pt(μ )-Spaces and the index of invariant subspaces.