Is there any kind of topology, natural or unnatural, that modules do have? Is there any geometric interpretation for flat modules? Is "exactness" of a sequence, any kind of geometric condition? Thanks.
Do modules have any topology?
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$\begingroup$
general-topology
commutative-algebra
modules
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0You can put a Zariski topology on the set of prime submodules of $M$ if $M$ is a multiplication module. – 2012-04-08