On the relation between continuous and combinatorial

Abstract

Axiomatic Cohesion proposes that the contrast between cohesion and non-cohesion may be expressed by means of a geometric morphism p :E S (between toposes) with certain special properties that allow to effectively use the intuition that the objects of E are `spaces' and those of S are `sets'. Such geometric morphisms are called (pre-)cohesive. We may also say that E is pre-cohesive (over S). In this case, the topos E determines an S-enriched `homotopy' category. The purpose of the present paper is to study certain aspects of this homotopy theory. We introduce weakly Kan objects in a pre-cohesive topos, which are analogous to Kan complexes in the topos of simplicial sets. Also, given a geometric morphism g:F between pre-cohesive toposes F and E (over the same base), we define what it means for g to preserve pieces. We prove that if g preserves pieces then it induces an adjunction between the homotopy categories determined by F and E, and that the direct image g*:F E preserves weakly Kan objects. These and other results support the intuition that the inverse image of g is `geometric realization'. In particular, since Kan complexes are weakly Kan in the pre-cohesive topos of simplicial sets, the result relating g and weakly Kan objects is analogous to the fact that the singular complex of a space is a Kan complex.