On factorization of separating maps on noncommutative Lp-spaces

Abstract

For any semifinite von Neumann algebra M and any 1≤ p<∞, we introduce a natutal S1-valued noncommutative Lp-space Lp( M;S1). We say that a bounded map T Lp( M) Lp( N) is S1-bounded (resp. S1-contractive) if T IS1 extends to a bounded (resp. contractive) map T IS1 from Lp( M;S1) into Lp( N;S1). We show that any completely positive map is S1-bounded, with T IS1 = T. We use the above as a tool to investigate the separating maps T Lp( M) Lp( N) which admit a direct Yeadon type factorization, that is, maps for which there exist a w*-continuous *-homomorphism J M N, a partial isometry w∈ N and a positive operator B affiliated with N such that w*w=J(1)=s(B), B commutes with the range of J, and T(x)=wBJ(x) for any x∈ M Lp( M). Given a separating isometry T Lp( M) Lp( N), we show that T is S1-contractive if and only if it admits a direct Yeadon type factorization. We further show that if p=2, the above holds true if and only if T is completely contractive.