Unit-Regularity of Regular Nilpotent Elements
Abstract
Let a be a regular element of a ring R. If either K:=rR(a) has the exchange property or every power of a is regular, then we prove that for every positive integer n there exist decompositions RR = K Xn Yn = En Xn aYn, where Yn ⊂eq anR and En R/aR. As applications we get easier proofs of the results that a strongly π-regular ring has stable range one and also that a strongly π-regular element whose every power is regular is unit-regular.
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