Countably Generated Matrix Algebras

Abstract

We define the completion of an associative algebra A in a set M=\M1,…,Mr\ of r right A-modules in such a way that if a⊂eq A is an ideal in a commutative ring A the completion A in the (right) module A/ a is AM A a. This works by defining AM as a formal algebra determined up to a computation in a category called GMMP-algebras. From deformation theory we get that the computation results in a formal algebra which is the prorepresenting hull of the noncommutative deformation functor, and this hull is unique up to isomorphism.