Some remarks on blueprints and F1-schemes

Abstract

Over the past two decades several different approaches to defining a geometry over F1 have been proposed. In this paper, relying on To\"en and Vaqui\'e's formalism, we investigate a new category Sch B of schemes admitting a Zariski cover by affine schemes relative to the category of blueprints introduced by Lorscheid. A blueprint, that may be thought of as a pair consisting of a monoid M and a relation on the semiring M F1 N, is a monoid object in a certain symmetric monoidal category B, which is shown to be complete, cocomplete, and closed. We prove that every B-scheme can be associated, through adjunctions, with both a classical scheme Z and a scheme over F1 in the sense of Deitmar, together with a natural transformation Z F1 Z. Furthermore, as an application, we show that the category of " F1-schemes" defined by A. Connes and C. Consani can be naturally merged with that of B-schemes to obtain a larger category, whose objects we call " F1-schemes with relations".