On the Bott periodicity, J-homomorphisms, transfer maps and H*Q0S-n

Abstract

The Curtis conjecture predicts that the only spherical classes in H*(Q0S0;/2) are the Hopf invariant one and the Kervaire invariant one elements. We consider Sullivan's decomposition Q0S0=J× J where J is the fibre of q-1 (q=3 at the prime 2) and observe that the Curtis conjecture holds when we restrict to J. We then use the Bott periodicity and the J-homomorphism SO Q0S0 to define some generators in H*(Q0S0;/p), when p is any prime, and determine the type of subalgebras that they generate. For p=2 we determine spherical classes in H*(k0J;/2). We determine truncated subalgebras inside H*(Q0S-k;/2). Applying the machinery of the Eilenberg-Moore spectral sequence we define classes that are not in the image of by the J-homomorphism. We shall make some partial observations on the algebraic structure of H*(k0 J;/2). Finally, we shall make some comments on the problem in the case equivariant J-homomorphisms.