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ON ANTISIMPLE GAMMA RINGS |
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| Abstract: | ABSTRACT In this note, we define the antisimple radical, A(M), of a Γ-ring M. A(M) is shown to be a special radical, and two characterizations of antisimple rings due to Szész are extended to Γ-rings. If R is the right operator ring of M, then A(R)* = A(M), where A(R) is the antisimple radical of R. If m,n are positive integers, then A(Mmn) = (A(M))mn, where Mmn denotes the group m x n matrices over M, considered as a Γnm -ring with the operations of matrix addition and multiplication. |
| Keywords: | 16A78 16A12 16A21 16A42 |