Bergman algebras: The graded universal algebra constructions

Abstract

A half a century ago, George Bergman introduced stunning machinery which would realise any commutative conical monoid as the non-stable K-theory of a ring. The ring constructed is ``minimal" or ``universal". Given the success of graded K-theory in classification of algebras and its connections to dynamics and operator algebras, the realisation of -monoids (monoids with an action of an abelian group on them) as non-stable graded K-theory of graded rings becomes vital. In this paper, we revisit Bergman's work and develop the graded version of this universal construction. For an abelian group , a -graded ring R, and non-zero graded finitely generated projective (left) R-modules P and Q, we construct a universal -graded ring extension S such that SR P SR Q as graded S-modules. This makes it possible to bring the graded techniques, such as smash products and Zhang twists into Bergman's machinery. Given a commutative conical -monoid M, we construct a -graded ring S such that Vgr(S) is -isomorphic to M. In fact we show that any finitely generated -monoid can be realised as the non-stable graded K-theory of a hyper Leavitt path algebra. Here Vgr(S) is the monoid of isomorphism classes of graded finitely generated projective S-modules and the action of on Vgr(S) is by shift of degrees. Thus the group completion of M can be realised as the graded Grothendieck group K0(S). We use this machinery to provide a short proof to the fullness of the graded Grothendieck functor Kgr0 for the class of Leavitt path algebras (i.e., Graded Classification Conjecture II).