Hopfological algebra, revisited

Abstract

We propose an ∞-categorical approach to Khovanov--Qi's Hopfological algebra that, in particular, refines several foundational aspects of the theory by recasting the previous constructions in terms of ∞-categories of modules in monoidal ∞-categories. This perspective leads to a more general variant of Hopfological algebra that takes place over an arbitrary rigidly-compactly generated symmetric monoidal stable ∞-category, which we also outline in the article. In the appendix, we compare the construction of Hopfological derived categories to that of Holm--Jørgensen's Q-shaped derived categories.