A categorical characterization of quantum projective Z-spaces

Abstract

In this paper, we study a generalization of the notion of AS-regularity for connected Z-algebras. Our main result is a characterization of those categories equivalent to noncommutative projective schemes associated to right coherent regular Z-algebras, which we call quantum projective Z-spaces in this paper. As an application, we show that smooth quadric hypersurfaces and the standard noncommutative smooth quadric surfaces have right noetherian AS-regular Z-algebras as homogeneous coordinate algebras. In particular, the latter are thus noncommutative P1× P1.