In abstract algebra, a derivation is a function on an algebra which generalizes certain features of the derivative operator. Specifically, given an algebra A over a ring or a field F, an F-derivation is an F-linear map D: A → A that satisfies Leibniz's law:
- D(ab) = (Da)b + a(Db).
More generally, an F-linear map D of A into an A-module M, satisfying the Leibniz law is also called a derivation. The collection of all F-derivations of A to itself is denoted by DerF(A). The collection of F-derivations of A into an A-module M is denoted by DerF(A,M).
Derivations occur in many different contexts in diverse areas of mathematics. The partial derivative with respect to a variable is an R-derivation on the algebra of real-valued differentiable functions on Rn. The Lie derivative with respect to a vector field is an R-derivation on the algebra of differentiable functions on a differentiable manifold; more generally it is a derivation on the tensor algebra of a manifold. The Pincherle derivative is an example of a derivation in abstract algebra. If the algebra over A is noncommutative, then the commutator with respect to an element of the algebra A defines a linear endomorphism of A to itself, which is a derivation over F. An algebra A equipped with a distinguished derivation d forms a differential algebra, and is itself a significant object of study in areas such as differential Galois theory.
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Properties
The Leibniz law itself has a number of immediate consequences. Firstly, if x1, x2, … ,xn ∈ A, then it follows by mathematical induction that
In particular, if A is commutative and x1 = x2 = … = xn, then this formula simplifies to the familiar power rule D(xn) = nxn−1D(x). If A is unital, then D(1) = 0 since D(1) = D(1·1) = D(1) + D(1). Thus, since D is k linear, it follows that D(x) = 0 for all x ∈ k.
If k ⊂ K is a subring, and A is a K-algebra, then there is an inclusion
since any K-derivation is a fortiori a k-derivation.
The set of k-derivations from A to M, Derk(A,M) is a module over k. Furthemore, the k-module Derk(A) forms a Lie algebra with Lie bracket defined by the commutator:
![[D_1,D_2] = D_1\circ D_2 - D_2\circ D_1.](http://wpcontent.answers.com/math/5/2/a/52a86cf13e6566d656d0daa5633111ff.png)
It is readily verified that the Lie bracket of two derivations is again a derivation.
Graded derivations
If we have a graded algebra A, and D is an homogeneous linear map of grade d = |D| on A then D is an homogeneous derivation if 
, ε = ±1 acting on homogeneous elements of A. A graded derivation is sum of homogeneous derivations with the same ε.
If the commutator factor ε = 1, this definition reduces to the usual case. If ε = −1, however, then 
, for odd |D|. They are called antiderivations.
Examples of anti-derivations include the exterior derivative and the interior product acting on differential forms.
Graded derivations of superalgebras (i.e. Z2-graded algebras) are often called superderivations.
See also
- In elemental differential geometry derivations are tangent vectors
- Kähler differential
References
- Bourbaki, Nicolas (1989), Algebra I, Elements of mathematics, Springer-Verlag, ISBN 3-540-64243-9.
- Eisenbud, David (1999), Commutative algebra with a view toward algebraic geometry (3rd. ed.), Springer-Verlag, ISBN 978-0387942698.
- Matsumura, Hideyuki (1970), Commutative algebra, Mathematics lecture note series, W. A. Benjamin, ISBN 978-0805370256.
- Kolař, Ivan; Slovák, Jan; Michor, Peter W. (1993), Natural operations in differential geometry, Springer-Verlag, http://www.emis.de/monographs/KSM/index.html.
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