Automorphisms of Deitmar schemes, I. Functoriality and Trees

Abstract

In a recent paper [3], the authors introduced a map F which associates a Deitmar scheme (which is defined over the field with one element, denoted by F1) with any given graph . By base extension, a scheme Xk = F() F1 k over any field k arises. In the present paper, we will show that all these mappings are functors, and we will use this fact to study automorphism groups of the schemes Xk. Several automorphism groups are considered: combinatorial, topological, and scheme-theoretic groups, and also groups induced by automorphisms of the ambient projective space. When is a finite tree, we will give a precise description of the combinatorial and projective groups, amongst other results.