Determining elements in Banach algebras through spectral properties

Abstract

Let A be a Banach algebra. By σ(x) and r(x) we denote the spectrum and the spectral radius of x∈ A, respectively. We consider the relationship between elements a,b∈ A that satisfy one of the following two conditions: (1) σ(ax) = σ(bx) for all x∈ A, (2) r(ax) r(bx) for all x∈ A. In particular we show that (1) implies a=b if A is a C*-algebra, and (2) implies a∈ C b if A is a prime C*-algebra. As an application of the results concerning the conditions (1) and (2) we obtain some spectral characterizations of multiplicative maps.