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Generalized Stable Regular Rings |
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| Abstract: | Abstract In this paper we show that a regular ring R is a generalized stable ring if and only if for every x ∈ R, there exist a w ∈ K(R) and a group G in R such that wx ∈ G. Also we show that if R is a generalized stable regular ring, then for any A ∈ M n (R), there exist right invertible matrices U 1, U 2 ∈ M n (R) and left invertible matrices V 1, V 2 ∈ M n (R) such that U 1 V 1 AU 2 V 2 = diag(e 1,…, e n ) for some idempotents e 1,…, e n ∈ R. |
| Keywords: | Regular ring Generalized stable ring Pseudo-similarity |