Seminar on trace maps

References

A file containing the following articles can be found in the library on the 5th floor.

[R1]

John Rognes.
Notes on topological cyclic homology and the cyclotomic trace map.
1996, http://www.math.uio.no/~rognes/papers/tcnotes.dvi.

[R2]

John Rognes.
On trace maps.
1998, http://www.math.uio.no/~rognes/papers/trace_maps.dvi.

[R3]

John Rognes.
Topological cyclic homology of S-algebras.
1998, http://www.math.uio.no/~rognes/papers/tc.dvi.

[M]

Ib Madsen.
Algebraic K-theory and traces.
In Current developments in mathematics, 1995 (Cambridge, MA), pages 191--321. Internat. Press, Cambridge, MA, 1994. [MR 98g:19004]

[BHM]

M. Bökstedt, W. C. Hsiang, and I. Madsen.
The cyclotomic trace and algebraic K-theory of spaces.
Invent. Math., 111(3):465--539, 1993. [MR 94g:55011]

[G]

Thomas G. Goodwillie.
The differential calculus of homotopy functors.
In Proceedings of the International Congress of Mathematicians, Vol. I, II (Kyoto, 1990), pages 621--630, Tokyo, 1991. Math. Soc. Japan. [MR 93g:55015]

[BCCGHM]

M. Bökstedt, G. Carlsson, R. Cohen, T. Goodwillie, W. C. Hsiang, and I. Madsen.
On the algebraic K-theory of simply connected spaces.
Duke Math. J., 84(3):541--563, 1996. [MR 97h:19002]

[J]

John D. S. Jones.
Cyclic homology and equivariant homology.
Invent. Math., 87(2):403--423, 1987. [MR 88f:18016]

[HM]

Lars Hesselholt and Ib Madsen.
On the K-theory of finite algebras over Witt vectors of perfect fields.
Topology, 36(1):29--101, 1997. [MR 97i:19002]

[DGMC]

B. I. Dundas, T. Goodwillie, and R. McCarthy.
The local structure of algebraic K-theory.
http://www.math.ntnu.no/~dundas/indexeng.html.

[B1]

Marcel Bökstedt.
Topological Hochschild homology.
Preprint, Bielefeld, 1988.

[B2]

Marcel Bökstedt.
Topological Hochschild homology of Z and Z/p.
Preprint, Bielefeld, 1988.