A Generalized Spectral Radius Formula and Olsen's Question

Abstract

Let A be a C*-algebra and I be a closed ideal in A. For x∈ A, its image under the canonical surjection A A/I is denoted by x, and the spectral radius of x is denoted by r(x). We prove that \r(x), \| x\|\ = ∈f \|(1+i)-1x(1+i)\| (where infimum is taken over all i∈ I such that 1+i is invertible), which generalizes spectral radius formula of Murphy and West MurphyWest (Rota for B(H) Rota). Moreover if r(x)< \| x\| then the infimum is attained. A similar result is proved for commuting family of elements of a C*-algebra. Using this we give a partial answer to an open question of C. Olsen: if p is a polynomial then for "almost every" operator T∈ B(H) there is a compact perturbation T+K of T such that \|p(T+K)\| = \|p(T)\|e. We show also that if operators A,B commute, A is similar to a contraction and B is similar to a strict contraction then they are simultaneously similar to contractions.