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10 Nov 2019
Prove that a commutative ring with identity has a unique maximal ideal if and only if the set of elements in R that are not units forms an ideal. In this case we say that R is a local ring.
Prove that a commutative ring with identity has a unique maximal ideal if and only if the set of elements in R that are not units forms an ideal. In this case we say that R is a local ring.
Nestor RutherfordLv2
30 Jan 2019