We analyze canonical operator space structures on the non-commutative Lp spaces Lpη(M; ϕ, ω) constructed by interpolation a la Stein–Weiss based on two normal semifinite faithful weights ϕ, ω on a W*-algebra M. We show that there is only one canonical (i.e. arising by interpolation operator space structure on Lp(M) when M and p are kept fixed. Namely, for any n.s.f. weights ϕ, ω on M and η∈[0, 1], the spaces Lpη(M; ϕ, ω) are all completely isomorphic when they are canonically considered as operator spaces. Finally, we also describe the norms on all matrix spaces n(Lp(M)) which determine such a canonical quantized structure.
Fidaleo, F. (1999). Canonical operator space structures in non-commutative L^p spaces. JOURNAL OF FUNCTIONAL ANALYSIS, 169(1), 226-250 [10.1006/jfan.1999.3498].
Canonical operator space structures in non-commutative L^p spaces
Fidaleo Francesco
1999-01-01
Abstract
We analyze canonical operator space structures on the non-commutative Lp spaces Lpη(M; ϕ, ω) constructed by interpolation a la Stein–Weiss based on two normal semifinite faithful weights ϕ, ω on a W*-algebra M. We show that there is only one canonical (i.e. arising by interpolation operator space structure on Lp(M) when M and p are kept fixed. Namely, for any n.s.f. weights ϕ, ω on M and η∈[0, 1], the spaces Lpη(M; ϕ, ω) are all completely isomorphic when they are canonically considered as operator spaces. Finally, we also describe the norms on all matrix spaces n(Lp(M)) which determine such a canonical quantized structure.I documenti in IRIS sono protetti da copyright e tutti i diritti sono riservati, salvo diversa indicazione.
