A spectrum-level splitting of the kuR-cooperations algebra

Abstract

In the 1980's, Mahowald and Kane used integral Brown--Gitler spectra to decompose ku ku as a sum of finitely generated ku-module spectra. This splitting, along with an analogous decomposition of ko ko, led to a great deal of progress in stable homotopy computations and understanding of v1-periodicity in the stable homotopy groups of spheres. In this paper, we construct a C2-equivariant lift of Mahowald and Kane's splitting of ku ku. We also describe the resulting C2-equivariant splitting in terms of C2-equivariant Adams covers and record an analogous splitting for HZ H Z. Along the way, we give complete computations of the kuR and H Z operations and cooperations algebras.

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