Notes on $δ$-algebras and prisms in homotopy theory

Jack Morava

Notes on $δ$-algebras and prisms in homotopy theory

Jack Morava

Abstract

J McClure's Dyer-Lashof operation in $p$-adic $K$-theory defines, in particular, a prismatic structure on the complex representation ring of the circle group. Work of Ando, Rezk, Stapleton, and others generalizes this to define a canonical lift of Frobenius for structured Lubin-Tate spectra. We suggest that recent work of K Ito and S Marks on $L$-typical prisms may extend this to local neighborhoods of the topological prime points $K(n)$ of the category of spectra.

Notes on $δ$-algebras and prisms in homotopy theory

Abstract

J McClure's Dyer-Lashof operation in

-adic

-theory defines, in particular, a prismatic structure on the complex representation ring of the circle group. Work of Ando, Rezk, Stapleton, and others generalizes this to define a canonical lift of Frobenius for structured Lubin-Tate spectra. We suggest that recent work of K Ito and S Marks on

-typical prisms may extend this to local neighborhoods of the topological prime points

of the category of spectra.

Paper Structure (23 equations)

This paper contains 23 equations.