Cyclic homology and equivariant homology.

J.D.S. Jones

Displaying similar documents to “Cyclic homology and equivariant homology.”

The Künneth Formula in Cyclic Homology.

Dan Burghelea, Crichton Ogle (1986)

Mathematische Zeitschrift

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The S1-CW decomposition of the geometric realization of a cyclic set

Zbigniew Fiedorowicz, Wojciech Gajda (1994)

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We show that the geometric realization of a cyclic set has a natural, $S^{1}$ -equivariant, cellular decomposition. As an application, we give another proof of a well-known isomorphism between cyclic homology of a cyclic space and $S^{1}$ -equivariant Borel homology of its geometric realization.

Cyclic homology and the Macdonald conjectures.

P. Hanion (1986)

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A Note on the Hochschild Homology and Cyclic Homology of a topological Algebra.

Reinhold Hübl (1992)

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Cyclic homology, a survey

Jean-Louis Loday (1986)

Banach Center Publications

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Cyclic homology and equivariant theories

Jean-Luc Brylinski (1987)

Annales de l'institut Fourier

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In this article, we present two possible extensions of the classical theory of equivariant cohomology. The first, due to P. Baum, R. MacPherson and the author, is called the “delocalized theory". We attempt to present it in very concrete form for a circle action on a smooth manifold. The second is the cyclic homology of the crossed- product algebra of the algebra of smooth functions on a manifold, by the convolution algebra of smooth functions on a Lie group, when such Lie group act...