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Mod p K-theory of ΩΣX revisited

Published online by Cambridge University Press:  24 October 2008

Takuji Kashiwabara
Takuji Kashiwabara
Affiliation:
Institut Galilée, Mathématiques, Université Paris-Nord, 93430 Villetaneuse, France
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Extract

In this note we present a new proof of a theorem of McClure on K*ΣX, Z/p) [11], in the special case when X is a finite complex with K1(X; Z/p) = 0. Although our method does not work in the full generality covered by his work, our argument requires neither a geometric interpretation of complex k-theory nor all the delicate coherence properties of its multiplication. Since BP-theory is not likely to possess such coherence properties [9], the possibility of generalizing his approach to the case of higher Morava K-theory does not seem feasible. On the contrary, the main ingredient of our approach is the rank formula for the Morava K-theory of the Borel construction [5], which works for any K(n); thus our approach is better adapted to the potential generalization [8]. Throughout the paper we assume that p > 2 so that mod p K-theory possesses a commutative multiplication, and denote by K*(−) the mod p K-theory. Since it is simpler to state our results in terms of CX, the combinatorial model for QX, rather than QX itself, we shall do so. This is sufficient, as when X is connected CX is homotopy equivalent to QX, and when not, K*(QX) can be easily recovered from K*(CX) (see e.g. [11]).

Type
Research Article
Information
Mathematical Proceedings of the Cambridge Philosophical Society , Volume 114 , Issue 2 , September 1993 , pp. 219 - 221
Copyright
Copyright © Cambridge Philosophical Society 1993

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References

REFERENCES

[1]Barratt, M. G.. A free group functor for stable homotopy. In Algebraic topology, Proc. sympos. pure math. vol. 22 (American Mathematical Society, 1971), 3135.CrossRefGoogle Scholar
[2]Becker, J. C. and Gottlieb, D. H.. The transfer map and fibrations. Topology 14 (1975), 112.CrossRefGoogle Scholar
[3]Cohen, F. R., May, J. P. and Taylor, L. R.. Splitting of certain spaces CX. Math. Proc. Cambridge Philos. Soc. 84 (1978), 465496.CrossRefGoogle Scholar
[4]Hodgkin, L.. Dyer–Lashof operators in K-theory. New Developments in topology, London Math. Soc. Lecture Note Ser. 11 (Cambridge University Press, 1974), 2732.CrossRefGoogle Scholar
[5]Hopkins, M. J., Kuhn, N. J. and Ravenel, D. C.. Generalized characters and complex oriented cohomology theories. Preprint.Google Scholar
[6]Hunton, J.. Morava K-theory of wreath products. Math. Proc. Cambridge Philos. Soc. 107 (1990), 309318.CrossRefGoogle Scholar
[7]Hunton, J.. Detruncating Morava K-theory. To appear in Adams Conference Proceedings.Google Scholar
[8]Kashiwabara, T.. On K(2)-homology of some infinite loop spaces. Preprint, 1993.Google Scholar
[9]Kashiwabara, T.. On higher commutativity for complex cobordism and Quillen's idempotent. In preparation.Google Scholar
[10]May, J. P.. The geometry of iterated loop spaces. Lecture Notes in Math. 271 (Springer-Verlag, 1972).CrossRefGoogle Scholar
[11]McClure, J. E.. Mod p K-theory of QX. In H Ring Spectra and their Applications, Lecture Notes in Math. 1176 (Springer-Verlag, 1986).Google Scholar
[12]McClure, J. E. and Snaith, V. P.. On the K-theory of extended power construction. Math. Proc. Cambridge Philos. Soc. 92 (1982), 263274.CrossRefGoogle Scholar
[13]Snaith, V. P.. Dyer–Lashof operations in K-theory. In Two independent contributions on K-theory, Lecture Notes in Math. 496 (Springer-Verlag, 1975), 103294.Google Scholar
[14]Snaith, V. P. A.. Stable decomposition for ΩnSnX. J. London Math. Soc. 2 (1974), 577583.CrossRefGoogle Scholar