Structure of total subspaces of dual Banach spaces
Abstract
Let X be a separable nonquasireflexive Banach space. Let Y be a Banach space isomorphic to a subspace of X*. The paper is devoted to the following questions: 1. Under what conditions does there exist an isomorphic embedding T:Y X* such that subspace T(Y)⊂ X* is total? 2. If such embeddings exist, what are the possible orders of T(Y)? Here we need to recall some definitions. For a subset M⊂ X* we denote the set of all limits of weak* convergent sequences in M by M(1). Inductively, for ordinal number α we let M(α)=β<α(M(β))(1). The least ordinal α for which M(α)= M(α+1) is called the order of M.
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