An abstract characterization of noncommutative projective lines

Abstract

Let k be a field. We describe necessary and sufficient conditions for a k-linear abelian category to be a noncommutative projective line, i.e. a noncommutative P1-bundle over a pair of division rings over k. As an application, we prove that P1n, Piontkovski's nth noncommutative projective line, is the noncommutative projectivization of an n-dimensional vector space.