Artin–Schelter regular algebras of dimension five with two generators

## Ž . x 106 1991 , pp. 335᎐388 and is either quadratic or cubic. The quadratic algebras A w are Koszul, and this fact was used by Le Bruyn, Smith, and Van den Bergh Le Ž . x Bruyn et al., Math. Z. 222 1996 , 171᎐212 to classify the four-dimensional AS Ž . regular algebras D when is quadratic an

Let A be a three dimensional Artin᎐Schelter regular algebra. We give a description of the category of finitely generated A-modules of Gelfand᎐Kirillov Ž . dimension one modulo those of finite dimension over the ground field . The proof is based upon a result by Gabriel which says that locally finite

We consider certain regular algebras of global dimension four that map surjectively onto the two-Veronese of a regular algebra of global dimension three on two generators. We also study the point modules.

The Segre embedding of ‫ސ‬ 1 = ‫ސ‬ 1 as a smooth quadric Q in ‫ސ‬ 3 corresponds to the surjection of the four-dimensional polynomial ring onto the Segre product S of two copies of the homogeneous coordinate ring of ‫ސ‬ 1 . We study Segre products of noncommutative algebras. If in particular A and B