A foundation for synthetic algebraic geometry
Journal article, 2024

This is a foundation for algebraic geometry, developed internal to the Zariski topos, building on the work of Kock and Blechschmidt (Kock (2006) [I.12], Blechschmidt (2017)). The Zariski topos consists of sheaves on the site opposite to the category of finitely presented algebras over a fixed ring, with the Zariski topology, that is, generating covers are given by localization maps for finitely many elements f (1) , ... , f(n) that generate the ideal (1) = A subset of A . We use homotopy-type theory together with three axioms as the internal language of a (higher) Zariski topos. One of our main contributions is the use of higher types - in the homotopical sense - to define and reason about cohomology. Actually computing cohomology groups seems to need a principle along the lines of our "Zariski local choice" axiom, which we justify as well as the other axioms using a cubical model of homotopy-type theory.

Algebraic geometry

homotopy type theory

cohomology

Author

Felix Cherubini

Chalmers, Computer Science and Engineering (Chalmers), Computing Science

University of Gothenburg

Thierry Coquand

University of Gothenburg

Chalmers, Computer Science and Engineering (Chalmers), Computing Science

Matthias Hutzler

University of Gothenburg

Chalmers, Computer Science and Engineering (Chalmers), Computing Science

Mathematical Structures in Computer Science

0960-1295 (ISSN) 1469-8072 (eISSN)

Vol. In Press

Subject Categories

Algebra and Logic

Geometry

DOI

10.1017/S0960129524000239

More information

Latest update

12/18/2024