Etale Homotopy Types and Bisimplicial Hypercovers

Abstract

An \'etale homotopy type T(X, z) associated to any pointed locally fibrant connected simplicial sheaf (X, z) on a pointed locally connected small Grothendieck site (C, x) is studied. It is shown that this type T(X, z) specializes to the \'etale homotopy type of Artin-Mazur for pointed connected schemes X, that it is invariant up to pro-isomorphism under pointed local weak equivalences (but see Schmidt1 for an earlier proof), and that it recovers abelian and nonabelian sheaf cohomology of X with constant coefficients. This type T(X, z) is compared to the \'etale homotopy type Tb(X, z) constructed by means of diagonals of pointed bisimplicial hypercovers of x = (X, z) in terms of the associated categories of cocycles, and it is shown that there are bijections π0 H(x, y) π0 H(x, y) at the level of path components for any locally fibrant target object y. This quickly leads to natural pro-isomorphisms T(X, z) Tb(X, z) in . By consequence one immediately establishes the fact that Tb(X, z) is invariant up to pro-isomorphism under pointed local weak equivalences. Analogous statements for the unpointed versions of these types also follow.