Atomic Toposes with Co-Well-Founded Categories of Atoms

Abstract

The atoms of the Schanuel topos can be described as the pairs (n,G) where n is a finite set and G is a subgroup of Aut(n). We give a general criterion on an atomic site ensuring that the atoms of the topos of sheaves on that site can be described in a similar fashion. We deduce that these toposes are locally finitely presentable. By applying this to the Malitz-Gregory atomic topos, we obtain a counter-example to the conjecture that every locally finitely presentable topos has enough points. We also work out a combinatorial property satisfied exactly when the sheaves for the atomic topology are the pullback-preserving functors. In this case, the category of atoms is particularly simple to describe.