Artin-Schelter Regular Algebras, Subalgebras, and Pushouts

Abstract

Take A to be a regular quadratic algebra of global dimension three. We observe that there are examples of A containing a dimension three regular cubic algebra C. If B is another dimension three regular quadratic algebra, also containing C as a subalgebra, then we can form the pushout algebra D of the inclusions i1:C A and i2:C B. We show that for a certain class of regular algebras C A,B, their pushouts D are regular quadratic algebras of global dimension four. Furthermore, some of the point module structures of the dimension three algebras get passed on to the pushout algebra D.