Commit: 6ed92f8527de1b84dd020ae49e70d477b0458f93 algebra.tex, lemma-NAK, Lemma[removed]Nakayama’s lemma.) If M is a finite nonzero module over R, then mM 6= M . Proof. Here is a silly way to prove this: If mM = M for M f - NAK - Document - PDFSEARCH.IO

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	Commit: 6ed92f8527de1b84dd020ae49e70d477b0458f93 algebra.tex, lemma-NAK, Lemma[removed]Nakayama’s lemma.) If M is a finite nonzero module over R, then mM 6= M . Proof. Here is a silly way to prove this: If mM = M for M f Add to Reading List Document Date: 2014-11-16 20:36:09 Open Document File Size: 144,86 KB Share Result on Facebook Position Prime Minister / / SocialTag Lemmas Homological algebra Ideal Commutative algebra Nakayama lemma Simple module Abstract algebra Algebra Module theory

Commit: 6ed92f8527de1b84dd020ae49e70d477b0458f93 algebra.tex, lemma-NAK, Lemma[removed]Nakayama’s lemma.) If M is a finite nonzero module over R, then mM 6= M . Proof. Here is a silly way to prove this: If mM = M for M fAdd to Reading List