Moving Weyl’s theorem from ⨍(T) to T

Abstract

Schmoeger has shown that if Weyl's theorem holds for an isoloid Banach space operator T ∈ B(X) with stable index, then it holds for ⨍(T) whenever ⨍ ∈ Holo σ (T) is a function holomorphic on some neighbourhood of the spectrum of T. In this note we establish a converse.