Prime affine algebras of Gelfand—Kirillov dimension one

It is shown that for certain classes of semigroup algebras \(K[S]\), including right noetherian algebras, the Gelfand-Kirillov dimension is finite whenever it is finite on all cancellative subsemigroups of \(S\). Moreover, the dimension of the algebra modulo the prime radical is then an integer. A d

We construct, for every real /3 > 2, a primitive affine algebra with Gelfand Kirillov dimension /3. Unlike earlier constructions, there are no assumptions on the base field. In particular, this is the first construction over N or C. Given a recursive sequence {v,} of elements in a free monoid, we in

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