On J. Borwein's concept of sequentially reflexive Banach spaces
Abstract
A Banach space X is reflexive if the Mackey topology τ(X*,X) on X* agrees with the norm topology on X*. Borwein [B] calls a Banach space X sequentially reflexive\/ provided that every τ(X*,X) convergent sequence\/ in X* is norm convergent. The main result in [B] is that X is sequentially reflexive if every separable subspace of X has separable dual, and Borwein asks for a characterization of sequentially reflexive spaces. Here we answer that question by proving Theorem. A Banach space X is sequentially reflexive if and only if 1 is not isomorphic to a subspace of X.
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