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Autore principale: Hörmann, Fritz
Natura: Preprint
Pubblicazione: 2025
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Accesso online:https://arxiv.org/abs/2507.15133
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author Hörmann, Fritz
author_facet Hörmann, Fritz
contents We discuss Lurie's (derived) bar and cobar constructions, the classical ones for simplicial groups and sets (due to Eilenberg-MacLane and Kan), and the classical ones for differential graded (co)algebras (due to Eilenberg-MacLane and Adams) and their relations, putting them into an abstract framework which makes sense much more generally for any cofibration of infinity-operads. Along these lines we give new and rather conceptual existence proofs of Lurie's adjunction (where bar is left adjoint) and the classical adjunction (where bar is right adjoint). We also recover various classical comparison maps, e.g. the Szczarba and Hess-Tonks maps comparing Adams cobar with Kan's loop group.
format Preprint
id arxiv_https___arxiv_org_abs_2507_15133
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Lectures on bar and cobar
Hörmann, Fritz
Algebraic Topology
Category Theory
55-01
We discuss Lurie's (derived) bar and cobar constructions, the classical ones for simplicial groups and sets (due to Eilenberg-MacLane and Kan), and the classical ones for differential graded (co)algebras (due to Eilenberg-MacLane and Adams) and their relations, putting them into an abstract framework which makes sense much more generally for any cofibration of infinity-operads. Along these lines we give new and rather conceptual existence proofs of Lurie's adjunction (where bar is left adjoint) and the classical adjunction (where bar is right adjoint). We also recover various classical comparison maps, e.g. the Szczarba and Hess-Tonks maps comparing Adams cobar with Kan's loop group.
title Lectures on bar and cobar
topic Algebraic Topology
Category Theory
55-01
url https://arxiv.org/abs/2507.15133