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

Abstract

We prove that for operator spaces V and W, the operator space V**h W** can be completely isometrically embedded into (Vh W)**, h being the Haagerup tensor product. It is also shown that, for exact operator spaces V and W, a jointly completely bounded bilinear form on V× W can be extended uniquely to a separately w*-continuous jointly completely bounded bilinear form on V**× W**. This paves the way to obtain a canonical embedding of V** W** into (V W)** with a continuous inverse, where is the operator space projective tensor product. Further, for C*-algebras A and B, we study the (closed) ideal structure of AB, which, in particular, determines the lattice of closed ideals of B(H) B(H) completely.