Contents

Definition

An ∞-group is a group object in ∞Grpd.

Equivalently (by the delooping hypothesis) it is a pointed connected $\infty$-groupoid.

Under the identification of ∞Grpd with Top this is known as an $A_\infty$-space, for instance.

An $\infty$-Lie group is accordingly a group object in ∞-Lie groupoids. And so on.

Properties

For details see groupoid object in an (∞,1)-category.

Models

By

• model structure on simplicial groups

• model structure on reduced simplicial sets

Related concepts and Examples

• group

• 2-group, braided 2-group

• n-group, k-tuply groupal n-groupoid

• $\infty$-group, braided ∞-group

  • looping and delooping

  • automorphism ∞-group

    • ∞-group of bisections

  • ∞-group of units

    • Picard ∞-group

      • Brauer ∞-group

  • center of an ∞-group

  • normal morphism of ∞-groups

  • stabilizer ∞-group

  • outer automorphism ∞-group

  • Eilenberg-MacLane object, ∞-gerbe

  • ∞-group cohomology

  • ∞-group extension

  • augmented ∞-group

  • ∞-group completion

  • finite ∞-group

• ∞-action

References

A standard textbook reference on $\infty$-groups in the classical model structure on simplicial sets is

• Paul Goerss, Rick Jardine, chapter V of Simplicial homotopy theory chapter V.

Group objects in (infinity,1)-categories are the topic of

• Jacob Lurie, section 6.1.2 in Higher Topos Theory

Model category presentations of group(oid) objects in $\infty Grpd$ by groupoidal complete Segal spaces are discussed in

• Julia Bergner,

  Adding inverses to diagrams encoding algebraic structures, Homology, Homotopy and Applications 10 (2008), no. 2, 149–174. (arXiv:0610291)

  Adding inverses to diagrams II: Invertible homotopy theories are spaces, Homology, Homotopy and Applications, Vol. 10 (2008), No. 2, pp.175-193. (web, arXiv:0710.2254)

Discussion from the point of view of category objects in an (∞,1)-category is in

• Jacob Lurie, (∞,2)-Categories and the Goodwillie Calculus (arXiv:0905.0462)

The homotopy theory of $\infty$-groups that are n-connected and r-truncated for $r \leq n$ is discussed in

• A.R. Garzón, J.G. Miranda, Serre homotopy theory in subcategories of simplicial groups Journal of Pure and Applied Algebra Volume 147, Issue 2, 24 March 2000, Pages 107-123

Discussion in homotopy type theory is in

• Ulrik Buchholtz, Floris van Doorn, Egbert Rijke, Higher Groups in Homotopy Type Theory (arXiv:1802.04315)

For more see the references at infinity-action.