Some classes of smooth bimodules over II1 factors and their associated 1-cohomology spaces

Abstract

We study several classes of Banach bimodules over a II1 factor M, endowed with topologies that make them &#34;smooth&#34; with respect to Lp-norms implemented by the trace on M. Letting M⊂ = (L2M), and 2≤ p < ∞, we consider: (1) the space (p), obtained as the completion of in the norm \[ Tp := \|φ(T)| φ∈ *, \|φ(xYz)| Y∈ ()1, x, z ∈ M (LpM)1\ ≤ 1 \; \] (2) the subspace (p)⊂ (p), obtained as the closure in (p) of the space of compact operators (L2M); (3) the space p⊂ of operators that are \, · \, p-limits of bounded sequences of operators in (L2M). We prove that p are all equal to the τ-rank-completion of (L2M) in , defined by align qM:= \K∈ (L2M) & ∃ Kn ∈ (L2M), pn∈ P(M), \\ & n \|pn(K-Kn)pn\|= 0, nτ(1-pn)=0\. align We show that any separable II1 factor M admits non-inner derivations into qM, but that any derivation δ:M → qM is a pointwise limit in τ-rank-metric of inner derivations.