Constructing Well-bounded Operators not of type (B) on a Class of Inductive Limits

Abstract

Well-bounded operators are linear operators on a Banach space X that have an AC[a,b] functional calculus for some interval [a,b]. A well-bounded operator is of type (B) if it can be written as an integral against a spectral family of projections, and this is always the case when X is reflexive. There are many examples of well-bounded operators on non-reflexive spaces that are not of type (B), and it is open whether there is a non-reflexive Banach space upon which every well-bounded operator is of type (B). The spaces constructed by Pisier, which answered a conjecture of Grothendieck in the negative, have been suggested by Cheng and Doust as a candidate to answer this open problem. In this paper, it will be shown that on a class of Banach spaces containing these spaces, there is always a well-bounded operator not of type (B).