On normed E∞-rings in genuine equivariant Cp-spectra

Abstract

Genuine equivariant homotopy theory is equipped with a multitude of coherently commutative multiplication structures generalizing the classical notion of an E∞-algebra. In this paper we study the Cp-E∞-algebras of Nardin--Shah with respect to a cyclic group Cp of prime power order. We show that many of the higher coherences inherent to the definition of parametrized algebras collapse; in particular, they may be described more simply and conceptually in terms of ordinary E∞-algebras as a diagram category which we call normed algebras. Our main result provides a relatively straightforward criterion for identifying Cp-E∞-algebra structures. We visit some applications of our result to real motivic invariants.