Contractivity of M\"obius functions of operators

Abstract

Let T be a injective bounded linear operator on a complex Hilbert space. We characterize the complex numbers λ,μ for which (I+λ T)(I+μ T)-1 is a contraction, the characterization being expressed in terms of the numerical range of the possibly unbounded operator T-1. When T=V, the Volterra operator on L2[0,1], this leads to a result of Khadkhuu, Zem\'anek and the second author, characterizing those λ,μ for which (I+λ V)(I+μ V)-1 is a contraction. Taking T=Vn, we further deduce that (I+λ Vn)(I+μ Vn)-1 is never a contraction if n2 and λμ.