Difference between revisions of "Quotient"
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==Concepts related to [[Factor (function)|factoring of functions]]== | ==Concepts related to [[Factor (function)|factoring of functions]]== | ||
* [[Quotient (function)]] - {{AKA}} factoring functions | * [[Quotient (function)]] - {{AKA}} factoring functions | ||
| + | * [[Quotient (group)]] - at least vector space quotients are actually an instance of this | ||
| + | * [[Quotient (module)]] | ||
| + | * [[Quotient (ring)]] | ||
* [[Quotient (topology)]] - the quotient [[Topological space|topology]] | * [[Quotient (topology)]] - the quotient [[Topological space|topology]] | ||
* [[Quotient (vector space)]] - of the form {{M|\frac{V}{W} }} where {{M|W}} is a [[vector subspace]] of a [[vector space]] {{M|V}} (over a [[field]] {{M|\mathbb{F} }}) | * [[Quotient (vector space)]] - of the form {{M|\frac{V}{W} }} where {{M|W}} is a [[vector subspace]] of a [[vector space]] {{M|V}} (over a [[field]] {{M|\mathbb{F} }}) | ||
Latest revision as of 22:20, 1 December 2016
Disambiguation
This page lists articles associated with the same title.
If an internal link led you here, you may wish to change the link to point directly to the intended article.
Quotient may refer to:
- Quotient (function) - AKA factoring functions
- Quotient (group) - at least vector space quotients are actually an instance of this
- Quotient (module)
- Quotient (ring)
- Quotient (topology) - the quotient topology
- Quotient (vector space) - of the form [ilmath]\frac{V}{W} [/ilmath] where [ilmath]W[/ilmath] is a vector subspace of a vector space [ilmath]V[/ilmath] (over a field [ilmath]\mathbb{F} [/ilmath])
Spaces
- Space of integer quotients - commonly written as "[ilmath]\mathbb{Q} [/ilmath]"
