University of Cambridge > Talks.cam > Isaac Newton Institute Seminar Series > Equivariant Higher Dixmier-Douady Theory for Circle Actions

Equivariant Higher Dixmier-Douady Theory for Circle Actions

Add to your list(s) Download to your calendar using vCal

If you have a question about this talk, please contact nobody.

OASW05 - OAS Follow on: Operator Algebras: Subfactors and Applications

Continuous fields of operator algebras have found applications in various different areas: among them representation theory, index theory, twisted K-theory and conformal field theory. While the classification of all continuous fields of simple C-algebras over a topological space is out of reach, section algebras of locally trivial bundles provide a family that is open to classification by methods from homotopy theory. Recently, such bundles also appeared in the classification of group actions on C-algebras. In joint work Marius Dadarlat and I showed that classical results by Dixmier and Douady generalise to the much larger family of bundles with fibres isomorphic to stabilised strongly self-absorbing C*-algebras. Applications in twisted K-theory revealed interesting examples of equivariant bundles, which motivates the question whether the classification also has an equivariant counterpart. As a starting point for a programme in this direction David Evans and I looked at circle actions on infinite tensor products of matrix algebras and proved that a lot of the theory still carries over. I will report on the progress in this direction.

This talk is part of the Isaac Newton Institute Seminar Series series.

Tell a friend about this talk:

This talk is included in these lists:

Note that ex-directory lists are not shown.

 

© 2006-2024 Talks.cam, University of Cambridge. Contact Us | Help and Documentation | Privacy and Publicity