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Index Theory of Elliptic Operators, Foliations, and Operator Algebras
About this Title
Jerome Kaminker, Kenneth C. Millett and Claude Schochet, Editors
Publication: Contemporary Mathematics
Publication Year:
1988; Volume 70
ISBNs: 978-0-8218-5077-0 (print); 978-0-8218-7659-6 (online)
DOI: https://doi.org/10.1090/conm/070
MathSciNet review: 948685
Table of Contents
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Front/Back Matter
Articles
- John Cantwell and Lawrence Conlon – The theory of levels [MR 948686]
- Ronald G. Douglas, Steven Hurder and Jerome Kaminker – Toeplitz operators and the eta invariant: the case of $S^1$ [MR 948687]
- Thierry Fack – Sur la conjecture de Novikov [MR 948688]
- Jeff Fox and Peter Haskell – A new proof of the $K$-amenability of $\textrm {SU}(1,1)$ [MR 948689]
- James L. Heitsch – Some interesting group actions [MR 948690]
- Connor Lazarov – A relation between index and exotic classes [MR 948691]
- Ib Madsen and Jonathan Rosenberg – The universal coefficient theorem for equivariant $K$-theory of real and complex $C^*$-algebras [MR 948692]
- N. Christopher Phillips – Equivariant $K$-theory for proper actions and $C^*$-algebras [MR 948693]
- N. Christopher Phillips – Equivariant $K$-theory for proper actions. II. Some cases in which finite-dimensional bundles suffice [MR 948694]
- John Roe – Operator algebras and index theory on noncompact manifolds [MR 948695]
- Jonathan Rosenberg – $K$-theory of group $C^*$-algebras, foliation $C^*$-algebras, and crossed products [MR 948696]
- Xiaolu Wang – Noncommutative “CW-complexes” [MR 948697]