Unstable 1-semiadditivity as classifying Goodwillie towers

Abstract

A stable ∞-category is 1-semiadditive if the norms for all finite group actions are equivalences. In the presence of 1-semiadditivity, Goodwillie calculus simplifies drastically. We introduce two variants of 1-semiadditivity for an ∞-category C and study their relation to the Goodwillie calculus of functors C → (C). We demonstrate that these variations of 1-semiadditivity are complete obstructions to the problem of endowing ∂ F with either a right module or a divided power right module structure which completely classifies the Goodwillie tower of F. We find applications to algebraic localizations of spaces, the Morita theory of operads, and bar-cobar duality of algebras. Along the way, we address several milestones in these areas including: Lie structures in the Goodwillie calculus of spaces, spectral Lie algebra models of vh-periodic homotopy theory, and the Poincar\'e/Koszul duality of Ed-algebras.