Abstract:
We propose a definition of varieties over “the field with one element”, a notion which had been imagined by Tits, Manin and others. Such a variety has an extension to the integers which is a usual algebraic variety. Examples include smooth toric varieties and euclidean lattices. We also define and compute a zeta function for these objects, and we propose a motivic interpretation of the image of Adams $J$-homomorphism.
Key words and phrases:Algebraic varieties, toric varieties, euclidean lattices, zeta functions, $J$-homomorphism.
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