Pairs of rings sharing their units
Abstract
We are working in the category of commutative unital rings and denote by U(R) the group of units of a nonzero ring R. An extension of rings R⊂eq S, satisfying U(R)=R U(S) is usually called local. This paper is devoted to the study of ring extensions such that U(R)= U(S), that we call strongly local. P. M. Cohn in a paper, entitled Rings with zero divisors, introduced some strongly local extensions. We generalized under the name Cohn's rings his definition and give a comprehensive study of these extensions. As a consequence, we give a constructive proof of his main result. Now Lequain and Doering studied strongly local extensions, where S is semilocal, so that S/ J(S), where J(S) is the Jacobson radical of S, is Von Neumann regular. These rings are usually called J-regular. We establish many results on J-regular rings in order to get substantial results on strongly local extensions when S is J-regular. The Picard group of a J-regular ring is trivial, allowing to evaluate the group U(S)/ U(R) when R is J-regular. We then are able to give a complete characterization of the Doering-Lequain context. A Section is devoted to examples. In particular, when R is a field, the strongly local and weakly strongly inert properties are equivalent.
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