Banach spaces with arbitrary finite Baire order

Abstract

We investigate intrinsic Baire classes of Banach spaces defined by Argyros, Godefroy and Rosenthal (2003). We introduce a construction, for any Banach space X with a basis, of an 1-saturated separable Banach space Y such that for any α ≤slant ω1 we have Y**1+α Y X**α, where X**α denotes the α-th intrinsic Baire class of X. We apply this construction to answer two open problems by Argyros, Godefroy and Rosenthal (2003), namely we build separable Banach spaces of any Baire order less or equal to ω, and a non-universal separable Banach space of order ω1. Finally, we apply the construction to show an analogue of a result of Lindenstrauss (1971) by constructing, for any Banach space X with a basis and any n ∈ N, a Banach space Y such that Y**n Y**n-1 X, showing that any such X can appear as the space of functionals in a bidual Banach space Y** that are of n-th intrinsic Baire class but not of (n-1)-th intrinsic Baire class.