Connes embedding problem

Connes embedding problem

In von Neumann algebras, the Connes embedding problem or conjecture, due to Alain Connes, asks whether every type II1 factor on a separable Hilbert space can be embedded into the ultrapower of the hyperfinite type II1 factor by a free ultrafilter. The problem admits a number of equivalent formulations.[1]

Statement

Let ω be a free ultrafilter on the natural numbers and let R be the hyperfinite type II1 factor with trace τ. One can construct the ultrapower Rω as follows: let l^\infty(R)=\{(x_n)_n\subseteq R:sup_n||x_n||<\infty\} be the von Neumann algebra of norm-bounded sequences and let I_\omega=\{(x_n)\in l^\infty(R):lim_{n\rightarrow\omega}\tau(x_n^*x_n)^{\frac{1}{2}}=0\}. The quotient l^\infty(R)/I_\omega turns out to be a II1 factor with trace \tau_{R^\omega}(x)=lim_{n\rightarrow\omega}\tau(x_n+I_\omega), where (xn)n is any representative sequence of x.


Connes' Embedding Conjecture asks whether every type II1 factor on a separable Hilbert space can be embedded into some Rω.


The isomorphism class of Rω depends on the ultrafilter if and only if continuum hypothesis is true (Ge-Hadwin and Farah-Hart-Sherman), but such an embedding property does not depend on the ultrafilter because von Neumann algebras acting on separable Hilbert spaces are, roughly speaking, very small.


References

  • Fields Workshop around Connes' Embedding Problem – University of Ottawa, May 16–18, 2008[2]
  • Survey on Connes' Embedding Conjecture, Valerio Capraro[3]
  • Model theory of operator algebras I: stability, I. Farah - B. Hart - D. Sherman[4]
  • Ultraproducts of C*-algebras, Ge and Hadwin, Oper. Theory Adv. Appl. 127 (2001), 305-326.
  • A linearization of Connes’ embedding problem, Benoıt Collins and Ken Dykema[5]
  • Notes On Automorphisms Of Ultrapowers Of II1 Factors, David Sherman, Department of Mathematics, University of Virginia[6]

Notes

  1. ^ http://www.jstor.org/pss/2669132
  2. ^ http://www.fields.utoronto.ca/programs/scientific/07-08/embedding/abstracts.html#brown
  3. ^ http://arxiv.org/PS_cache/arxiv/pdf/1003/1003.2076v1.pdf
  4. ^ http://people.virginia.edu/~des5e/papers/2009c30-stable-appl.pdf
  5. ^ http://www.emis.de/journals/NYJM/j/2008/14-28.pdf
  6. ^ http://people.virginia.edu/~des5e/papers/sm-autultra.pdf

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