Homotopy Type Theory infinity-group > history (Rev #1, changes)

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Definition

An ∞\infty-group or pointed connected type consists of

  • A type GG
  • A basepoint e:Ge:G
  • A 0-connector
    ΞΊ 1:∏ f:Gβ†’πŸ™βˆ a:πŸ™isContr([fiber(f,a)] 0)\kappa_1:\prod_{f:G \to \mathbb{1}} \prod_{a:\mathbb{1}} \mathrm{isContr}(\left[\mathrm{fiber}(f, a)\right]_{0})

See also

References

Revision on May 1, 2022 at 22:59:30 by Anonymous?. See the history of this page for a list of all contributions to it.