Notes on real interpolation of operator Lp-spaces

Abstract

Let M be a semifinite von Neumann algebra. We equip the associated noncommutative Lp-spaces with their natural operator space structure introduced by Pisier via complex interpolation. On the other hand, for 1<p<∞ let Lp,p(M)=(L∞(M),\,L1(M))1p,\,p be equipped with the operator space structure via real interpolation as defined by the second named author ( J. Funct. Anal. 139 (1996), 500--539). We show that Lp,p(M)=Lp(M) completely isomorphically if and only if M is finite dimensional. This solves in the negative the three problems left open in the quoted work of the second author. We also show that for 1<p<∞ and 1 q∞ with p≠ q (L∞(M;q),\,L1(M;q))1p,\,p=Lp(M; q) with equivalent norms, i.e., at the Banach space level if and only if M is isomorphic, as a Banach space, to a commutative von Neumann algebra. Our third result concerns the following inequality: \|(Σixiq)1q\|Lp(M)\|(Σixir)1r\|Lp(M) for any finite sequence (xi)⊂ Lp+(M), where 0<r<q<∞ and 0<p∞. If M is not isomorphic, as a Banach space, to a commutative von Meumann algebra, then this inequality holds if and only if p r.