Dimitri Ara
Published 2012-06-13, updated 2012-09-26Version 2
We present a slight variation on a notion of weak \infty-groupoid introduced by Grothendieck in Pursuing Stacks and we study the homotopy theory of these \infty-groupoids. We prove that the obvious definition for homotopy groups of Grothendieck \infty-groupoids does not depend on any choice. This allows us to give equivalent characterizations of weak equivalences of Grothendieck \infty-groupoids, generalizing a well-known result for strict \infty-groupoids. On the other hand, given a model category M in which every object is fibrant, we construct, following Grothendieck, a fundamental \infty-groupoid functor \Pi_\infty from M to the category of Grothendieck \infty-groupoids. We show that if X is an object of M, then the homotopy groups of \Pi_\infty(X) and of X are canonically isomorphic. We deduce that the functor \Pi_\infty respects weak equivalences.
Comments: 58 pages, v2: revised according to referee's comments, in particular: paragraph headings added, Remark 1.13 added, Section 3 partially rewritten
Journal: Journal of Pure and Applied Algebra 217(7) (2013), 1237-1278
Strict \infty-groupoids are Grothendieck \infty-groupoids
On the homotopy theory of n-types
A discrete model of $S^1$-homotopy theory
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