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 , the so-called field with one element, should look like. Namely, every split reductive group over should descend to , and its group of -rational points should be its Weyl group. We connect the notion of a torified variety to the notion of -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 -schemes with two classes of morphisms, one leading to a satisfying notion of -rational points, the other leading to the notion of an algebraic group over such that every split reductive group is defined as an algebraic group over . Furthermore, we show that certain combinatorics that are expected from parabolic subgroups of and Grassmann varieties are realized in this theory.
Cite
@article{arxiv.0907.3824,
title = {Algebraic groups over the field with one element},
author = {Oliver Lorscheid},
journal= {arXiv preprint arXiv:0907.3824},
year = {2009}
}