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Note on desuspending the Adams map

Published online by Cambridge University Press:  24 October 2008

F. R. Cohen  and
J. A. Neisendorfer
F. R. Cohen
Affiliation:
University of Kentuckyand Ohio State University
J. A. Neisendorfer
Affiliation:
University of Kentuckyand Ohio State University
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Extract

Let p denote a fixed prime and let Pn(pr) denote the cofibre of the degree pr map on Sn–1. We consider π*P3(pr) and show that the map q in the cofibre sequence

induces a split epimorphism on the p-primary component of π2pS3 if p > 2. That analogous maps q: Pn(pr) →Sn, n ≥ 4, induce split epimorphisms on the p-primary component of πn+2p-3Sn, p > 2, is shown in work of J. F. Adams [1]. It is the purpose of this note to document the above computation in the case n = 3 for the use of others.

Type
Research Article
Information
Mathematical Proceedings of the Cambridge Philosophical Society , Volume 99 , Issue 1 , January 1986 , pp. 59 - 64
Copyright
Copyright © Cambridge Philosophical Society 1986

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References

REFERENCES

[1]Adams, J. F.. On the groups J(X), IV. Topology 5 (1966), 2171.CrossRefGoogle Scholar
[2]Cohen, F. R., Moore, J. C. and Neisendorfer, J. A.. Torsion in homotopy groups. Ann. of Math. 109 (1979), 121168.CrossRefGoogle Scholar
[3]Cohen, F. R., Moore, J. C. and Neisendorfer, J. A.. The double suspension and p-primary components of the homotopy groups of spheres. Ann. of Math. 110 (1979), 549565.CrossRefGoogle Scholar
[4]Cohen, F. R., Moore, J. C. and Neisendorfer, J. A.. Exponents in homotopy theory, to appear in the Conference Proceedings in honor of J. C. Moore's 60th birthday.Google Scholar
[5]Neisendorfer, J. A.. Primary homotopy theory. Memoirs of the A.M.S., 232, 1980.Google Scholar
[6]Neisendorfer, J. A.. 3 primary exponents. Math. Proc. Cambridge Philos. Soc. 90 (1981), 163183.CrossRefGoogle Scholar
[7]Whitehead, G. W.. Elements of Homotopy Theory. Graduate Texts in Mathematics (Springer-Verlag, 1978).CrossRefGoogle Scholar