Difference between revisions of "Domain (ring theory)"

Latest revision as of 22:55, 2 November 2021

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-In [[ring theory]], a [[ring]] <math>A</math> is a '''domain''' if <math>ab = 0</math> implies that <math>a=0</math> or <math>b=0</math>, for all <math>a,b \in A</math>.  Equivalently, <math>A</math> is a domain if it has no [[zero divisor]]s.  If <math>A</math> is commutative, it is called an '''[[integral domain]]'''.
+#REDIRECT [[Domain (Ring theory)]]
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-[[Category:Ring theory]]