Analyticity, rank one perturbations and the invariance of the left spectrum

Abstract

We address the question of the analyticity of a rank one perturbation of an analytic operator. If Mz is the bounded operator of multiplication by z on a functional Hilbert space H and f ∈ H with f(0)=0, then Mz + f 1 is always analytic. If f(0) ≠ 0, then the analyticity of Mz + f 1 is characterized in terms of the membership to H of the formal power series obtained by multiplying f(z) by 1f(0)-z. As an application, we discuss the problem of the invariance of the left spectrum under rank one perturbation. In particular, we show that the left spectrum σl(T + f g) of the rank one perturbation T + f g, \,g ∈ (T*), of a cyclic analytic left invertible bounded linear operator T coincides with the left spectrum of T except the point ∈pfg. In general, the point ∈pfg may or may not belong to σl(T + f g). However, if it belongs to σl(T + f g) \0\, then it is a simple eigenvalue of T + f g.