Topos points of quasi-coherent sheaves over monoid schemes

Abstract

Let X be a monoid scheme. We will show that the stalk at any point of X defines a point of the topos (X) of quasi-coherent sheaves over X. As it turns out, every topos point of (X) is of this form if X satisfies some finiteness conditions. In particular, it suffices for M/M× to be finitely generated when X is affine, where M× is the group of invertible elements. This allows us to prove that two quasi-projective monoid schemes X and Y are isomorphic if and only if (X) and (Y) are equivalent. The finiteness conditions are essential, as one can already conclude by the work of A. Connes and C. Consani cc1. We will study the topos points of free commutative monoids and show that already for N∞, there are `hidden' points. That is to say, there are topos points which are not coming from prime ideals. This observation reveals that there might be a more interesting `geometry of monoids'.