Algebraic groups over the field with one element

Abstract

Remarks in a paper by Jacques Tits from 1956 led to a philosophy how a theory of split reductive groups over 1, the so-called field with one element, should look like. Namely, every split reductive group over should descend to 1, and its group of 1-rational points should be its Weyl group. We connect the notion of a torified variety to the notion of 1-schemes as introduced by Connes and Consani. This yields models of toric varieties, Schubert varieties and split reductive groups as -schemes. We endow the class of 1-schemes with two classes of morphisms, one leading to a satisfying notion of 1-rational points, the other leading to the notion of an algebraic group over 1 such that every split reductive group is defined as an algebraic group over 1. Furthermore, we show that certain combinatorics that are expected from parabolic subgroups of (n) and Grassmann varieties are realized in this theory.