Positselski duality in ∞-categories

Abstract

We introduce the notion of a contramodule over a cocommutative coalgebra in a presentably symmetric monoidal ∞-category C, and prove a symmetric monoidal ∞-categorical version of Positselski's comodule-contramodule correspondence when the coalgebra is coidempotent. This gives a new perspective on, and a new proof of local duality -- in the sense of Hovey--Palmieri--Strickland and Dwyer--Greenlees -- whenever C is stable and compactly generated. We further consider an analog of Positselski's definition of contramodules over topological rings in the ∞-categorical setting, and show that the two perspectives on contramodules are equivalent. As examples we describe the categories of K(n)-local spectra, T(n)-local spectra and the derived complete category of a ring R, as categories of contramodules.

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