The numerical radius Haagerup norm and Hilbert space square factorizations
Abstract
We study a factorization of bounded linear maps from an operator space A to its dual space A*. It is shown that T : A A* factors through a pair of a column Hilbert spaces Hc and its dual space if and only if T is a bounded linear form on A A by the canonical identification equipped with a numerical radius type Haagerup norm. As a consequence, we characterize a bounded linear map from a Banach space to its dual space, which factors through a pair of Hilbert spaces.
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