arnaldur
Mar3-09, 09:52 AM
Here is a question for some algebra wiz out there:
If M is a finitely generated module over a commutative ring R, is itīs module of endomorphisms, EndR(M), also finitely generated?
A proof or counterexample is wanted.
If M is a finitely generated module over a commutative ring R, is itīs module of endomorphisms, EndR(M), also finitely generated?
A proof or counterexample is wanted.