Localization and Affine Schemes over F1

Abstract

We develop the basic notions of commutative algebra and algebraic geometry over the field with one element F1, working within the Connes-Consani framework, which models F1-algebras as monoid objects in the category of Γ-sets. In this setting, F1-algebras generalize commutative rings by encoding the algebraic structure functorially, using machinery originating in homotopy theory. Our main contribution is a theory of localization for F1-algebras and the construction of prime spectrum A for a commutative F1-algebra A. We then prove that Γ(X, OX) = A for any absolute affine scheme X= A and establish an anti-equivalence between the category of commutative F1-algebras and the category of absolute affine schemes.

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