Bilinear forms and the 2-problem in Banach spaces
Abstract
Let X be a Banach space and let (X) denote the kernel of a quotient map 1() X. We show that 2(X,X*)=0 if and only if bilinear forms on (X) extend to 1(). From that we obtain i) If (X) is a L1-space then 2(X,X*)=0; ii) If X is separable, (X) is not an L1 space and 2(X,X*)=0 then (X) has an unconditional basis. This provides new insight into a question of Palamodov in the category of Banach spaces.
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