Generalized Steenrod-Hopf Invariants for Stable Homotopy Theory

Krueger, Warren M.

doi:10.2307/2039603

Proceedings of the American Mathematical Society

1973

DOI: 10.2307/2039603

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Generalized Steenrod-Hopf Invariants for Stable Homotopy Theory

Warren M. Krueger¹

Abstract: Abstract.In his paper On the groups J(X). IV, Adams suggested that one might try to continue his d and e invariants to a sequence of higher homotopy invariants, each defined upon the vanishing of its predecessors and each taking its value in a certain Ext group. Recently he pointed out the efficacy of relocating his d and e invariants in Ext groups formed over a certain abelian category of comodules. It is the purpose of this note to carry out the program suggested above in a setting of the sort just mentioned… Show more

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Peterson-Stein formulas in the Adams spectral sequence

Krueger¹

1976

Proc. Amer. Math. Soc.

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Abstract.The purpose of this note is to establish Peterson-Stein formulas for second order differentials in the Adams spectral sequence.In [4], Peterson and Stein related certain values of secondary cohomology operations to the values of certain functional primary operations. Their method was that of universal example. Here using a different approach, we establish analogous formulas for second order and functional first order differentials which occur in the version of the Adams spectral sequence that is formulated with respect to F* homology in the stable homotopy category [1, p. 238]. (For these formulas we do not need the assumptions which serve to identify E2 or assure convergence.)

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Peterson-Stein formulas in the Adams spectral sequence

Krueger¹

1976

Proc. Amer. Math. Soc.

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Hopf invariants and Browder’s work on the Kervaire invariant problem

Krueger¹

1977

Trans. Amer. Math. Soc.

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Abstract. In this paper we calculate certain functional differentials in the Adams spectral sequence converging to Wu cobordism whose values may be thought of as Hopf invariants. These results are applied to reobtain Browder's characterization: if q + 1 = 2*, there is a 2q dimensional manifold of Kervaire invariant one if and only if hi survives to EX(S°).Introduction. In 1969 Browder [2] showed that there is a 2q dimensional framed manifold with Kervaire invariant one if and only if q 4-1 = 2* and A2 survives to £,00(S,°). More precisely in case q + 1 = 2k, if (M2q, F) is a framed manifold whose Thorn invariant is/ E irlq(S°), then Browder showed that the Kervaire invariant, K(M2q, F), is one if and only if/projects to h\ in £¿'2*+'(5°). On the other hand, the present author [3] introduced homotopy invariants Ix and 72 which are defined on certain subgroups of the homotopy groups trJ(X) of a spectrum X and which take their values in the E2 term of an Adams spectral sequence for X. For the mod 2 Adams spectral sequence of S° and an element/ E ir2q(S°), I2(f) is always defined, and if q + 1 = 2k, A2 survives if and only if there is/ G w2*+<_2(S°) so that 72(/) = A2. Thus we can restate Browder's theorem (at least in dimension q + 1 = 2k) as follows.

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Generalized Steenrod-Hopf Invariants for Stable Homotopy Theory

Cited by 2 publications

References 2 publications

Peterson-Stein formulas in the Adams spectral sequence

Peterson-Stein formulas in the Adams spectral sequence

Hopf invariants and Browder’s work on the Kervaire invariant problem

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