Tensor products of measurable Banach bundles

Abstract

We study injective and projective tensor products of measurable Banach bundles. More precisely, given two separable measurable Banach bundles E, F defined over a probability space ( X,, m), we construct two measurable Banach bundles E F and Eπ F over ( X,, m) such that ( E F)( E)( F) and ( Eπ F)( E)π( F), where G( G) is the map assigning to a measurable Banach bundle G its space of L∞( m)-sections, while ( E)( F) and ( E)π( F) denote the injective and projective tensor products, respectively, of ( E) and ( F) in the sense of L∞( m)-Banach L∞( m)-modules. In combination with previous results, this provides a fiberwise representation of the injective tensor product M N and the projective tensor product Mπ N of two countably-generated L∞( m)-Banach L∞( m)-modules M, N.