On the group structure of [ S2, Y]

Abstract

Let J(X) denote the James construction on a space X and Jn(X) be the n-th stage of the James filtration of J(X). It is known that [J(X), Y] ← [Jn(X), Y] for any space Y. When X= S1, the circle, J( S1)= S1= S2. Furthermore, there is a bijection between [J( S1), Y] and the product Πi=2∞ πi(Y), as sets. In this paper, we describe the group structure of [Jn( S1), Y] by determining the co-multiplication structure on the suspension Jn( S1).