Nicola Gigli, Danka Lučić, Enrico Pasqualetto
Published 2022-07-11Version 1
We give a general description of the dual of the pullback of a normed module. Ours is the natural generalization to the context of modules of the well-known fact that the dual of the Lebesgue-Bochner space $L^p([0,1],B)$ consists - quite roughly said - of $L^q$ maps from $[0,1]$ to the dual $B'$ of $B$ equipped with the weak$^*$ topology. In order to state our result, we study various fiberwise descriptions of a normed module that are of independent interest.
Representation theorems for normed modules
Projective and injective tensor products of Banach $L^0$-modules
Metric version of projectivity for normed modules over sequence algebras
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