Maps between spherical group rings

Abstract

We prove that for finitely generated abelian groups A and B, the space of E∞-ring maps between the spherical groups rings S[A] S[B] is equivalent to the discrete set of group homomorphisms A B. We also prove generalizations where the sphere is replaced by other ring spectra, e.g. we give a formula for the strict units in group rings of the form R[A] for A a finite p-group and R p-completely chromatically complete.

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