English

A derived Milnor-Moore theorem

Algebraic Topology 2025-08-08 v2

Abstract

For every stable presentably symmetric monoidal \infty-category C\mathcal{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)\mathcal{U}: \mathrm{Alg}_{\mathrm{Lie}}(\mathcal{C}) \to \mathrm{Hopf}(\mathcal{C}) from Lie algebras in C\mathcal{C} to cocommutative Hopf algebras in C\mathcal{C} left adjoint to a functor of derived primitive elements Prim\mathrm{Prim}. We study the unit of this adjunction in rational and chromatic homotopy theory: we prove that if C\mathcal{C} is a rational stable presentably symmetric monoidal \infty-category, the enveloping Hopf algebra functor U:AlgLie(C)Hopf(C)\mathcal{U}: \mathrm{Alg}_{\mathrm{Lie}}(\mathcal{C}) \to \mathrm{Hopf}(\mathcal{C}) is fully faithful reproving a result of Gaitsgory-Rozenblyum. Let n1n \geq 1 be a natural and Φ[1]:SvnAlgLie(SpTn)\Phi[-1]: \mathcal{S}_{v_n} \to \mathrm{Alg}_{\mathrm{Lie}}(\mathrm{Sp}_{T_n}) the shifted Bousfield-Kuhn functor from vnv_n-periodic homotopy types to spectral Lie algebras in TnT_n-local spectra. We prove that for every vnv_n-periodic homotopy type XX the unit Φ(X)[1]PrimU(Φ(X)[1])\Phi(X)[-1] \to Prim \mathcal{U}(\Phi(X)[-1]) identifies with the Goodwillie completion Φlimn0Pn(Φ) \Phi \to \lim_{n \geq 0} P_n(\Phi) evaluated at the loop space of X.X.

Keywords

Cite

@article{arxiv.2408.06917,
  title  = {A derived Milnor-Moore theorem},
  author = {Hadrian Heine},
  journal= {arXiv preprint arXiv:2408.06917},
  year   = {2025}
}
R2 v1 2026-06-28T18:11:47.604Z