Dmitri Pavlov
Published 2013-09-30, updated 2019-12-21Version 2
We prove that the multiplication map L^a(M)\otimes_M L^b(M)\to L^{a+b}(M) is an isometric isomorphism of (quasi)Banach M-M-bimodules. Here L^a(M)=L_{1/a}(M) is the noncommutative L_p-space of an arbitrary von Neumann algebra M and \otimes_M denotes the algebraic tensor product over M equipped with the (quasi)projective tensor norm, but without any kind of completion. Similarly, the left multiplication map L^a(M)\to Hom_M(L^b(M),L^{a+b}(M)) is an isometric isomorphism of (quasi)Banach M-M-bimodules, where Hom_M denotes the algebraic internal hom. In particular, we establish an automatic continuity result for such maps. Applications of these results include establishing explicit algebraic equivalences between the categories of L_p(M)-modules of Junge and Sherman for all p\ge0, as well as identifying subspaces of the space of bilinear forms on L^p-spaces.
Comments: 22 pages. Comments and questions are very welcome. v2: Contains the journal version together with additional expository material
Journal: Journal of Mathematical Analysis and Applications 456:1 (2017), 229-244
Haagerup approximation property for arbitrary von Neumann algebras
Applications of the Fuglede-Kadison determinant: Szegö's theorem and outers for noncommutative $H^p$
$\ell^1$-contractive maps on noncommutative $L^p$-spaces
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