Minimal commutant and double commutant property for analytic Toeplitz operators

Abstract

In this paper we study the minimality of the commutant of an analytic Toeplitz operator M, when M is defined on the Hardy space H2(D) and ∈ H∞(D), denotes a bounded analytic function on D. Specifically we show that the commutant of M is minimal if and only if the polynomials on are weak-star dense in H∞(D), that is, is a weak-star generator of H∞(D). We use our result to characterize when the double commutant of an analytic Toeplitz operator M is minimal, for a large class of symbols . Namelly, when is an entire function, or more generally when belongs to the Thomson-Cowen's class.