For any element a in an exchange ring R, we show that there is an idempotent e is an element of aR boolean AND R a such that 1 - e is an element of (1 - a) R boolean AND R (1 - a). A closely related result is that a ring R is an exchange ring if and only if, for every a is an element of R, there exists an idempotent e is an element of R a such that 1 - e is an element of ( 1- a) R. The Main Theorem of this paper is a general two-sided statement on exchange elements in arbitrary rings which subsumes both of these results. Finally, applications of these results are given to the study of the endomorphism rings of exchange modules.

• 出版日期2015-8