Commutator estimates for normal operators in factors with applications to derivations

Abstract

For a normal measurable operator a affiliated with a von Neumann factor M we show: If M is infinite, then there is λ0∈ C so that for >0 there are u=u*, v∈ U(M) with v|[a,u]|v*≥(1-)(|a-λ01|+u|a-λ01|u). If M is finite, then there is λ0∈C and u,v∈U(M) so that v|[a,u]|v*≥ 32(|a-λ01|+u|a-λ01|u*). These bounds are optimal for infinite factors, II1-factors and some In-factors. Furthermore, for finite factors applying \|·\|1-norms to the inequality provides estimates on the norm of the inner derivation δa:M L1(M,τ) associated to a. While by [3,Theorem 1.1] it is known for finite factors and self-adjoint a∈ L1(M,τ) that \|δa\|M L1(M,τ) = 2z∈ C\|a-z\|1, we present concrete examples of finite factors M and normal operators a∈ M for which this fails.