Power Operations in Morava E-Theory of Flat Ring Spectra
Abstract
Let En be Morava E-theory of height n. Let R be a p-adically flat commutative ring spectrum. Then the Tate-valued Frobenius map endows π0 R with the structure of a δ-ring. On the other hand, we may form the K(n)-completed tensor product LK(n)(R En), which is a K(n)-local En-algebra. Then π0(LK(n)(R En)) = LTn π0 R admits the structure of an algebra over the monad T(n) defined by Rezk. The T(n)-algebra structure encodes the power operations of LK(n)(R En). In this paper we describe the T(n)-algebra structure on π0(LK(n)(R En)).
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