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Line 3: {{Ring theory sidebar}} {{Algebraic structures\|module}} In [[mathematics]], a '''module''' is a generalization of the notion of [[vector space]] in which the [[Field (mathematics)\|field]] of [[scalar (mathematics)\|scalars]] is replaced by a [[Ring (mathematics)\|ring]]. The concept of ''module'' ~~generalizes also~~elaborates the notion of [[abelian group]], ~~since~~in ~~the~~that all abelian groups are ~~exactly the~~ modules over the ring of [[integer]]s, and some abelian groups are modules over other rings as well. Like a vector space, a module is an additive abelian group, and scalar multiplication is [[Distributive property\|distributive]] over the operation of addition between elements of the ring or module and is [[Semigroup action\|compatible]] with the ring multiplication.

Module (mathematics): Difference between revisions