Some results about the Schroeder-Bernstein Property for separable Banach spaces

Details Some results about the Schroeder-Bernstein Property for separable Banach spaces Some results about the Schroeder-Bernstein Property for separable Banach spaces

2004-06-23

arxiv.org/abs/math/0406479v1

Mathematics

Functional Analysis

25 pages

Scientific paper

We construct a continuum of mutually non-isomorphic separable Banach spaces which are complemented in each other. Consequently, the Schroeder-Bernstein Index of any of these spaces is $2^{\aleph_0}$. Our construction is based on a Banach space introduced by W. T. Gowers and B. Maurey in 1997. We also use classical descriptive set theory methods, as in some work of V. Ferenczi and C. Rosendal, to improve some results of P. G. Casazza and of N. J. Kalton on the Schroeder-Bernstein Property for spaces with an unconditional finite-dimensional Schauder decomposition.

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