Compact operators that commute with a contraction

Abstract

Let T be a C0--contraction on a separable Hilbert space. We assume that IH-T*T is compact. For a function f holomorphic in the unit disk and continuous on , we show that f(T) is compact if and only if f vanishes on σ (T) , where σ (T) is the spectrum of T and the unit circle. If f is just a bounded holomorphic function on we prove that f(T) is compact if and only if n ∞ Tnf(T) =0.