Residue Complex for Regular Algebras of Dimension 2

We describe the residue complex for three-dimensional Sklyanin algebras, which are the interesting special cases of quantum polynomial rings in three variables. In particular, we show that the multiplicities of the point modules in the residue complex are all one, just as in the classical case of co

## 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

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

We show that if A is a semisimple Hopf algebra of dimension pq 2 over an algebraically closed field k of characteristic zero, then under certain restrictions either A or A \* must have a non-trivial central group-like element. We then classify all semisimple Hopf algebras of dimension pq 2 over k wh

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