On a generalization of Bourgain's tree index
Abstract
For a Banach space X, a sequence of Banach spaces (Yn), and a Banach space Z with an unconditional basis, D. Alspach and B. Sari introduced a generalization of a Bourgain tree called a (n Yn)Z-tree in X. These authors also prove that any separable Banach space admitting a (n Yn)Z-tree with order ω1 admits a subspace isomorphic to (n Yn)Z. In this paper we give two new proofs of this result.
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