A Note on Spectral Mapping Theorems for Subnormal Operators

Abstract

For a compact subset K⊂ C and a positive finite Borel measure μ supported on K, let Rat(K) denote the space of rational functions with poles off K, let R∞ (K,μ) be the weak-star closure of Rat(K) in L∞ (μ), and let R2 (K,μ) be the closure of Rat(K) in L2(μ). We show that there exists a compact subset K⊂ C, a positive finite Borel measure μ supported on K, and a function f∈ R∞ (K,μ) such that R∞ (K,μ) has no non-trivial direct L∞ summands, f is invertible in R2 (K,μ) L∞(μ), and f is not invertible in R∞ (K,μ). The result answers an open question concerning spectral mapping theorems for subnormal operators raised by J. Dudziak in 1984.