A derived Milnor-Moore theorem

Abstract

For every stable presentably symmetric monoidal ∞-category C we use the Koszul duality between the spectral Lie operad and the cocommutative cooperad to construct an enveloping Hopf algebra functor U: AlgLie(C) Hopf(C) from Lie algebras in C to cocommutative Hopf algebras in C left adjoint to a functor of derived primitive elements Prim. We study the unit of this adjunction in rational and chromatic homotopy theory: we prove that if C is a rational stable presentably symmetric monoidal ∞-category, the enveloping Hopf algebra functor U: AlgLie(C) Hopf(C) is fully faithful reproving a result of Gaitsgory-Rozenblyum. Let n ≥ 1 be a natural and [-1]: Svn AlgLie(SpTn) the shifted Bousfield-Kuhn functor from vn-periodic homotopy types to spectral Lie algebras in Tn-local spectra. We prove that for every vn-periodic homotopy type X the unit (X)[-1] Prim U((X)[-1]) identifies with the Goodwillie completion n ≥ 0 Pn() evaluated at the loop space of X.