Approximation in the mean by rational functions

Abstract

For 1 t < ∞, a compact subset K⊂ 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 abpe(Rt(K, μ)) denote the set of analytic bounded point evaluations. The objective of this paper is to describe the structure of Rt(K, μ). In the work of Thomson on describing the closure in Lt(μ) of analytic polynomials, Pt(μ), the existence of analytic bounded point evaluations plays critical roles, while abpe(Rt(K, μ)) may be empty. We introduce the concept of non-removable boundary F such that the removable set R = K F contains abpe(Rt(K, μ)). Recent remarkable developments in analytic capacity and Cauchy transform provide us the necessary tools to describe F and obtain structural results for Rt(K, μ). Assume that Rt(K, μ) does not have a direct Lt summand. Let H∞ R( L2 R) be the weak* closure in L∞ ( L2 R) of the functions that are bounded analytic off compact subsets of F, where L2 R denotes the planar Lebesgue measure restricted to R. We prove that the identity map (r→ r, r is a rational function with poles off K) extends an isometric isomorphism and a weak* homeomorphism from Rt(K, μ) L∞(μ ) onto H∞ R( L2 R ). Consequently, we show that a decomposition theorem (Main Theorem II) of Rt(K, μ) holds for an arbitrary compact subset K and a finite positive measure μ supported on K, which extends the central results regarding Pt(μ).