Localization in Associative Rings

Abstract

In arXiv:2511.04191 we constructed schemes of objects in small categories which contained a set of basepoints with local representing (localizing) objects. Here we prove that the category Rings of associative rings with unit has a certain set of basepoints for which localizing rings exist. We take the set of base points B to be the set of rings on the form Z(M) where M is a simple right A-module for some associative ring A. The set of base-points in the associative ring A is defined as B(A)=\Rings(A, Z(M))\. For any finite subset M⊂eqB(A) we prove that the localizing ring AM exists. and so the construction from arXiv:2511.04191 gives a definition of schemes of associative algebras. Defining a topology on B(A) such that when A is commutative it is the Zariski topology, we get the ordinary definition of schemes when we consider the category of commutative rings. This article is in line with the philosophy that a scheme is a moduli of its base-points.

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