The homotopy-invariance of constructible sheaves

Abstract

The purpose of this paper is to explain why the functor that sends a stratified topological space S to the ∞-category of constructible (hyper)sheaves on S with coefficients in a large class of presentable ∞categories is homotopy-invariant. To do this, we first establish a number of results in the unstratified setting, i.e., the setting of locally constant (hyper)sheaves. For example, if X is a locally weakly contractible topological space and E is a presentable ∞-category, then we give a concrete formula for the constant hypersheaf functor E Shhyp(X;E). This formula lets us show that the constant hypersheaf functor is a right adjoint, and is fully faithful if X is also weakly contractible. It also lets us prove a general monodromy equivalence and categorical K\"unneth formula for locally constant hypersheaves.