Trace ideal criteria for embeddings and composition operators on model spaces

Abstract

Let Kθ be a model space generated by an inner function θ. We study the Schatten class membership of embeddings I : Kθ L2(μ), μ a positive measure, and of composition operators Cφ:Kθ H2( D) with a holomprphic function φ: D→ D. In the case of one-component inner functions θ we show that the problem can be reduced to the study of natural extensions of I and Cφ to the Hardy-Smirnov space E2(D) in some domain D⊃ D. In particular, we obtain a characterization of Schatten membership of Cφ in terms of Nevanlinna counting function. By example this characterization does not hold true for general φ.