Extensions of square stable range one
Abstract
An ideal I of a ring R is square stable if aR+bR=R with a∈ I and b∈ R implies that a2+by is invertible in I for some y∈ I. We prove that an exchange ideal I of a ring R is square stable if and only if for any a∈ I, a2\ in J(R) implies that a∈ J(R), if and only if every regular element in I is strongly regular.
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