Localization theory in an ∞-topos

Abstract

We develop the theory of reflective subfibrations on an ∞-topos E. A reflective subfibration L on E is a pullback-compatible assignment of a reflective subcategory DX⊂eq E/X, for every X ∈ E. Reflective subfibrations abound in homotopy theory, albeit often disguised, e.g., as stable factorization systems. We prove that L-local maps (i.e., those maps that belong to some DX) admit a classifying map, and we introduce the class of L-separated maps, that is, those maps with L-local diagonal. L-separated maps are the local class of maps for a reflective subfibration L' on E. We prove this fact in the compantion paper "L'-localization in an ∞-topos". In this paper, we investigate some interactions between L and L' and explain when the two reflective subfibrations coincide.