English

Completely Bounded Representations Into Von Neumann Algebras And Connes Embedding Problem

Operator Algebras 2026-01-06 v1

Abstract

In this paper, we prove that if A\mathcal{A} is a unital separable CC^*-algebra, M\mathcal{M} is a von Neumann algebra which has the Kirchberg's quotient weak expectation property (QWEP), and ϕ:AM\phi:\, \mathcal{A}\rightarrow \mathcal{M} is a unital completely bounded representation, then there is an invertible operator SMS\in \mathcal{M} such that Sϕ()S1S\phi(\cdot) S^{-1} is a \ast-representation. On the other hand, Gilles Pisier proved the following result: a unital CC^*-algebra A\mathcal{A} is nuclear if and only if for every unital completely bounded representation ϕ\phi of A\mathcal{A} into an arbitrary von Neumann algebra M\mathcal{M} there is an invertible operator SMS\in \mathcal{M} such that Sϕ()S1S\phi(\cdot) S^{-1} is a \ast-representation. This implies that there exist von Neumann algebras which are not QWEP. Eberhard Kirchberg showed that every von Neumann algebra has QWEP if and only if every tracial von Neumann algebra embeds into the ultrapower Rw\mathcal{R}^w of the hyperfinite type II1{\rm II}_1 factor R\mathcal{R}. This provides a negative answer to the Connes Embedding Problem. This paper relies on previous work of Gilles Pisier and Florin Pop.

Keywords

Cite

@article{arxiv.2601.01733,
  title  = {Completely Bounded Representations Into Von Neumann Algebras And Connes Embedding Problem},
  author = {Junsheng Fang and Chunlan Jiang and Liguang Wang and Yanli Wang},
  journal= {arXiv preprint arXiv:2601.01733},
  year   = {2026}
}

Comments

18pages

R2 v1 2026-07-01T08:50:15.266Z