English

Operator space projective tensor product: Embedding into second dual and ideal structure

Operator Algebras 2011-06-15 v1

Abstract

We prove that for operator spaces VV and WW, the operator space VhWV^{**}\otimes_h W^{**} can be completely isometrically embedded into (VhW)(V\otimes_h W)^{**}, h\otimes_h being the Haagerup tensor product. It is also shown that, for exact operator spaces VV and WW, a jointly completely bounded bilinear form on V×WV\times W can be extended uniquely to a separately ww^*-continuous jointly completely bounded bilinear form on V×W V^{**}\times W^{**}. This paves the way to obtain a canonical embedding of V^WV^{**}\hat{\otimes} W^{**} into (V^W)(V\hat{\otimes} W)^{**} with a continuous inverse, where ^\hat{\otimes} is the operator space projective tensor product. Further, for CC^*-algebras AA and BB, we study the (closed) ideal structure of A^BA\hat{\otimes}B, which, in particular, determines the lattice of closed ideals of B(H)^B(H)B(H)\hat{\otimes} B(H) completely.

Keywords

Cite

@article{arxiv.1106.2644,
  title  = {Operator space projective tensor product: Embedding into second dual and ideal structure},
  author = {Ranjana Jain and Ajay Kumar},
  journal= {arXiv preprint arXiv:1106.2644},
  year   = {2011}
}

Comments

13 pages

R2 v1 2026-06-21T18:22:03.385Z