The fifth algebraic transfer in generic degrees and validation of a localized Kameko's conjecture

Abstract

This paper develops our previous works concerning the classical Peterson hit problem for the polynomial algebra on five variables over the mod--2 Steenrod algebra A in a generic family of degrees, together with applications to the fifth Singer algebraic transfer and a localized variation of Kameko's conjecture. As a topological illustration of the usefulness of the Steenrod algebra, we prove that CP4/CP2 and S6 S8 are not homotopy equivalent by showing that their mod--2 cohomologies are not isomorphic as A-modules, and we further determine the homotopy type of the quotient CPn/CP\,n-2 for all n 3. For the generic degrees under consideration, we determine the relevant cohit spaces and describe the associated GL(5, F2)-module structure. As a consequence, the fifth algebraic transfer is an isomorphism in an explicit infinite family of internal degrees. These results were independently verified by implementations in SageMath and OSCAR. We also study a localized form of Kameko's conjecture concerning the dimensions of the indecomposables F2 A F2[x1,…,xm] relative to parameter vectors, and prove that this conjecture holds for all m 1 in certain degrees.

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