F sequences and finite operators

Abstract

This article analyzes F sequences of projections for bounded linear operators and their relationship to the class of finite operators introduced by Williams in the 70ies. We prove that each essentially hyponormal operator has a proper F sequence (i.e. a F sequence of projections strongly converging to 1). In particular, any quasinormal, any subnormal, any hyponormal and any essentially normal operator has a proper F sequence. Moreover, we show that an operator is finite if and only if it has a proper F sequence or if it has a non-trivial finite dimensional reducing subspace. We also analyze the structure of operators which have no F sequence and give examples of them. For this analysis we introduce the notion of strongly non-F operators, which are far from finite block reducible operators, in some uniform sense, and show that this class coincides with the class of non-finite operators.