On the groups J(X). IV

Abstract

INTRODUCTION From one point of view, the present paper is mainly concerned with specialising the results on the groups J(X), given in previous papers of this series, to the case X = Sn . It can, however, be read independently of the previous papers in this series; because from another point of view, it is concerned with the use of extraordinary cohomology theories to define invariants of homotopy classes of maps; and this machinery can be set up independently of the previous papers in this series. We refer to them only for certain key results. From a third point of view, this paper represents a very belated attempt to honour the following two sentences in an earlier paper. “However, it appears to the author that one can obtain much better results on the J-homomorphism by using the methods, rather than the results, of the present paper. On these grounds, it seems best to postpone discussion of the J-homomorphism to a subsequent paper.” I offer topologists in general my sincere apologies for my long delay in writing up results which mostly date from 1961/62. I will now summarise the results which relate to the homotopy groups of spheres. For this one needs some notation.