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In [[mathematics]], a '''derivation''' is a map which has formal algebraic properties generalising those of the [[derivative]].
In [[mathematics]], a '''derivation''' is a map which has formal algebraic properties generalising those of the [[derivative]].


Let ''R'' be a [[ring (mathematics)]] and ''A'' an ''R''-algebra (''A'' is a ring containing a copy of ''R'' in the [[centre of a ring|centre]]).  A derivation is an ''R''-linear map ''D'' from ''A'' to some ''A''-module ''M'' with the property that
Let ''R'' be a [[ring (mathematics)|ring]] and ''A'' an ''R''-algebra (''A'' is a ring containing a copy of ''R'' in the [[centre of a ring|centre]]).  A derivation is an ''R''-linear map ''D'' from ''A'' to some ''A''-module ''M'' with the property that


:<math>D(ab) = a \cdot D(b) + D(a) \cdot b .\,</math>
:<math>D(ab) = a \cdot D(b) + D(a) \cdot b .\,</math>
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==Examples==
==Examples==
* The [[zero map]] is a derivation.
* The [[zero map]] is a derivation.
* The [[formal derivative]] is a derivation on the polynomial ring ''R''[''X''] with constants ''R''.
* The [[formal derivative]] is a derivation on the [[polynomial ring]] ''R''[''X''] with constants ''R''.


==Universal derivation==
==Universal derivation==
There is a ''universal'' derivation (Ω,''d'') with a [[universal property]].  Given a derivation ''D'':''A'' → ''M'', there is a unique ''A''-linear ''f'':Ω → ''M'' such that ''D'' = ''d''.''f''.  Hence
There is a ''universal'' derivation (Ω,''d'') with a [[universal property]].  Given a derivation ''D'':''A'' → ''M'', there is a unique ''A''-linear ''f'':Ω → ''M'' such that ''D'' = ''d''&middot;''f''.  Hence


:<math> \operatorname{Der}_R(A,M) = \operatorname{Hom}_A(\Omega,M) \,</math>
:<math> \operatorname{Der}_R(A,M) = \operatorname{Hom}_A(\Omega,M) \,</math>
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==Kähler differentials==
==Kähler differentials==
A '''[[Kähler differential]]''', or '''formal differential form''', is an element of the universal derivation space Ω, hence of the form &Sigma;<sub>''i''</sub> ''x<sub>i</sub>'' ''dy<sub>i</sub>''.  An ''exact'' differential is of the form <math>dy</math> for some ''y'' in ''A''.  The exact differentials form a submodule of Ω.
A [[Kähler differential]], or formal differential form, is an element of the universal derivation space Ω, hence of the form &Sigma;<sub>''i''</sub> ''x<sub>i</sub>'' ''dy<sub>i</sub>''.  An ''exact'' differential is of the form <math>dy</math> for some ''y'' in ''A''.  The exact differentials form a submodule of Ω.[[Category:Suggestion Bot Tag]]
 
==References==
* {{cite book | author=David M. Goldschmidt | title=Algebraic Functions and Projective Curves | series=[[Graduate Texts in Mathematics]] | volume=215 | publisher=[[Springer-Verlag]] | year=2003 | isbn=0-387-95432-5 | pages=24-30 }}
* {{cite book | author=Serge Lang | authorlink=Serge Lang | title=Algebra | edition=3rd ed | publisher=[[Addison-Wesley]] | year=1993 | isbn=0-201-55540-9 | pages=746-749 }}

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In mathematics, a derivation is a map which has formal algebraic properties generalising those of the derivative.

Let R be a ring and A an R-algebra (A is a ring containing a copy of R in the centre). A derivation is an R-linear map D from A to some A-module M with the property that

The constants of D are the elements mapped to zero. The constants include the copy of R inside A.

A derivation "on" A is a derivation from A to A.

Linear combinations of derivations are again derivations, so the derivations from A to M form an R-module, denoted DerR(A,M).

Examples

Universal derivation

There is a universal derivation (Ω,d) with a universal property. Given a derivation D:AM, there is a unique A-linear f:Ω → M such that D = d·f. Hence

as a functorial isomorphism.

Consider the multiplication map μ on the tensor product (over R)

defined by . Let J be the kernel of μ. We define the module of differentials

as an ideal in , where the A-module structure is given by A acting on the first factor, that is, as . We define the map d from A to Ω by

.

This is the universal derivation.

Kähler differentials

A Kähler differential, or formal differential form, is an element of the universal derivation space Ω, hence of the form Σi xi dyi. An exact differential is of the form for some y in A. The exact differentials form a submodule of Ω.