Operator inequalities implying similarity to a contraction

Abstract

Let T be a bounded linear operator on a Hilbert space H such that \[ α[T*,T]:=Σn=0∞ αn T*nTn 0. \] where α(t)=Σn=0∞ αn tn is a suitable analytic function in the unit disc D with real coefficients. We prove that if α(t) = (1-t) α (t), where α has no roots in [0,1], then T is similar to a contraction. Operators of this type have been investigated by Agler, M\"uller, Olofsson, Pott and others, however, we treat cases where their techniques do not apply. We write down an explicit Nagy-Foias type model of an operator in this class and discuss its usual consequences (completeness of eigenfunctions, similarity to a normal operator, etc.). We also show that the limits of \|Tnh\| as n∞, h∈ H, do not exist in general, but do exist if an additional assumption on α is imposed. Our approach is based on a factorization lemma for certain weighted 1 Banach algebras.