Stable topological cyclic homology is topological Hochschild homology
$K$-theory - Strasbourg, 1992, Astérisque, no. 226 (1994), 18 p.
@incollection{AST_1994__226__175_0,
author = {Hesselholt, Lars},
title = {Stable topological cyclic homology is topological {Hochschild} homology},
booktitle = {<span class="mathjax-formula">$K$</span>-theory - Strasbourg, 1992},
author = {Collectif},
series = {Ast\'erisque},
publisher = {Soci\'et\'e math\'ematique de France},
number = {226},
year = {1994},
zbl = {0816.19002},
mrnumber = {1317119},
language = {en},
url = {http://archive.numdam.org/item/AST_1994__226__175_0/}
}
TY  - CHAP
AU  - Hesselholt, Lars
TI  - Stable topological cyclic homology is topological Hochschild homology
BT  - <span class="mathjax-formula">$K$</span>-theory - Strasbourg, 1992
AU  - Collectif
T3  - Astérisque
PY  - 1994
DA  - 1994///
IS  - 226
PB  - Société mathématique de France
UR  - http://archive.numdam.org/item/AST_1994__226__175_0/
UR  - https://zbmath.org/?q=an%3A0816.19002
UR  - https://www.ams.org/mathscinet-getitem?mr=1317119
LA  - en
ID  - AST_1994__226__175_0
ER  - 
Hesselholt, Lars. Stable topological cyclic homology is topological Hochschild homology, dans $K$-theory - Strasbourg, 1992, Astérisque, no. 226 (1994), 18 p. http://archive.numdam.org/item/AST_1994__226__175_0/

[1] M. Bökstedt, Topological Hochschild Homology, to appear in Topology. | Zbl 0816.19001

[2] M. Bökstedt, W. C. Hsiang, I. Madsen, The Cyclotomic Trace and Algebraic $K$-theory of Spaces, Invent. Math. (1993). | EuDML 144086 | MR 1202133 | Zbl 0804.55004

[3] M. Bökstedt, I. Madsen, Topological Cyclic Homology of the Integers, these proceedings. | Zbl 0816.19001

[4] B. Dundas, R. Mccarthy, Stable $K$-theory and Topological Hochschild Homology, preprint Brown University. | Article | MR 1343326 | Zbl 0833.55007

[5] T. Goodwillie, Notes on the Cyclotomic Trace, MSRI (unpublished).

[6] L. Hesselholt, I. Madsen, Topological Cyclic Homology of Dual Numbers and their Finite Fields, preprint series, Aarhus University (1993).

[7] J. D. S. Jones, Cyclic Homology and Equivariant Homology, Invent. math. 87 (1987), 403-423. | Article | EuDML 143427 | MR 870737 | Zbl 0644.55005

[8] C. Kassel, La $K$-théorie Stable, Bull. Soc. math., France 110 (1982), 381-416. | EuDML 87424 | Numdam | MR 694757 | Zbl 0507.18003

[9] L. G. Lewis, J. P. May, M. Steinberger, Stable Equivariant Homotopy Theory, LNM 1213. | Zbl 0611.55001

[10] S. Maclane, Categories for the Working Mathematician, GTM 5, Springer-Verlag. | MR 354798 | Zbl 0705.18001

[11] I. Madsen, The Cyclotomic Trace in Algebraic $K$-theory, Proc. ECM, Paris, France (1992). | Zbl 0866.55009

[12] T. Pirashvili, F. Waldhausen, MacLane Homology and Topological Hochschild Homology, J. Pure Appl. Alg 82 (1992), 81-99. | Article | MR 1181095 | Zbl 0767.55010

[13] G. Segal, Classifying Spaces and Spectral Sequences, Publ. Math. I.H.E.S. 34 (1968), 105-112. | Article | EuDML 103878 | Numdam | MR 232393 | Zbl 0199.26404

[14] G. Segal, Categories and Cohomology Theories, Topology 13 (1974), 293-312. | Article | MR 353298 | Zbl 0284.55016

[15] F. Waldhausen, Algebraic $K$-theory of Spaces II, Algebraic Topology Aarhus 1978, LNM 763, 356-394. | MR 561230 | Zbl 0431.57004