On Commutative Reduced Baer Rings
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Abstract:
It is shown that a commutative reduced ring R is a Baer ring if and only if it is a CS-ring; if and only if every dense subset of Spec (R) containing Max (R) is an extremally disconnected space; if and only if every non-zero ideal of R is essential in a principal ideal generated by an idempotent.
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full textMy Resources
Journal title
volume 15 issue 4
pages -
publication date 2004-12-01
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