Norming subspaces of Banach spaces
Abstract
We show that, if X is a closed subspace of a Banach space E and Z is a closed subspace of E* such that Z is norming for X and X is total over Z (as well as X is norming for Z and Z is total over X), then X and the pre-annihilator of Z are complemented in E whenever Z is w*-closed or X is reflexive.
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