Does dimension of a module (say, dimension of its support) have anything to do with the supremum length of chains of prime submodules like rings?
Let's restrict to finitely generated modules over Noetherian ring.
Prime submodules are defined analogously to primary submodules: a submodule P in M is prime if P$neq$M and $M/P$ has no zero divisors, i.e. $amin P$ implies $min P$ or $a in mbox{Ann}(M/P)$.
Sunday, 7 December 2014
Dimension of module
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