Constructible hypersheaves via exit paths

Abstract

The goal of this article is to extend a theorem of Lurie \[ ShA (X) = Fun(ExitA (X), S) \] representing constructible sheaves with values in S , the ∞ -category of spaces, on a stratified space X with poset of strata A , as functors from the exit paths ∞ -category ExitA (X) to S . Lurie's representation theorem works provided A satisfy the ascending chain condition. This typically rules out infinite dimensional examples of stratified space. Building on it and with the help of a stratified homotopy invariance theorem from Haine, we show that when X is a nice enough A -stratified space and when A is itself stratified A≤ 0 ⊂ A≤ 1 ⊂ ·s ⊂ A by posets satisfying the ascending chain condition, \[ HypA (X) = Fun(ExitA(X), S) \] the ∞ -category of A -constructible hypersheaves on X is represented by functors from the exit paths ∞ -category of X . There are two types of nice stratified spaces on which this extended representation theorem applies: conically stratified spaces and spaces that are sequential colimits of conically stratified spaces. Examples of application include the metric and the topological exponentials of a Fr\'echet manifold, locally countable simplicial complexes and more generally, locally countable cylindrically normal CW-complexes.