Additive power operations in equivariant cohomology

Abstract

Let G be a finite group and E be an H∞-ring G-spectrum. For any G-space X and positive integer m, we give an explicit description of the smallest Mackey ideal J in E0(X× Bm) for which the reduced mth power operation E0(X) E0(X × Bm )/J is a map of Green functors. We obtain this result as a special case of a general theorem that we establish in the context of G×m-Green functors. This theorem also specializes to characterize the appropriate ideal J when E is a G∞-ring in global spectra. We give example computations for the sphere spectrum, complex K-theory, and Morava E-theory.