Projective Space in Synthetic Algebraic Geometry
Abstract
Synthetic algebraic geometry is a new approach to algebraic geometry. It consists in using homotopy type theory extended with three axioms, together with the interpretation of these in a higher version of the Zariski topos, in order to do algebraic geometry internally to this topos. In this article, we will show basic properties of projective n-space Pn in synthetic algebraic geometry. In particular, we show that the automorphism group of Pn is PGLn+1(R) and that the picard group is Z. We will provide different proofs of the latter statement, where the most synthetic approach naturally leads to the refined statement that the type of line bundles on Pn is the higher type Z× K(R×,1), where K(R×,1) is a delooping of the group of units of the internal base ring R.
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