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EspañolDIFFERENTIAL (CALCULUS)
(Redirected from Differential (mathematics))
In mathematics, and more specifically, in differential calculus, the term 'differential' has several interrelated meanings.
★ In traditional approaches to calculus, the differential of a function represents an infinitesimal change in its value. Although this is not a precise notion, there are several ways to make sense of it rigorously.
★ The differential is another name for the Jacobian matrix of partial derivatives of a function from 'R'm to 'R'n (especially when this matrix is viewed as a linear map).
★ More generally, the ''differential or pushforward'' refers to the derivative of a map between smooth manifolds and the pushforward operations it defines. The differential is also used to define the dual concept of pullback.
★ Stochastic calculus provides a notion of stochastic differential and an associated calculus for stochastic processes.
The notion of a differential motivates several concepts in differential geometry (and differential topology).
★ Differential forms provide a framework which accommodates multiplication and differentiation of differentials.
★ The exterior derivative is a notion of differentiation of differential forms which generalizes the differential of a function (which is a differential 1-form).
★ Pullback is, in particular, a geometric name for the chain rule for composing a map between manifolds with a differential form on the target manifold.
★ Covariant derivatives or differentials provide a general notion for differentiating of vector fields and tensor fields on a manifold, or, more generally, sections of a vector bundle: see Connection (vector bundle). This ultimately leads to the general concept of a connection.
Differentials are also important in algebraic geometry, and there are several important notions.
★ Abelian differentials usually refer to differential one-forms on an algebraic curve or Riemann surface.
★ Quadratic differentials (which behave like "squares" of abelian differentials) are also important in the theory of Riemann surfaces.
★ Kahler differentials provide a general notion of differential in algebraic geometry
The term ''differential'' has also been adopted in homological algebra and algebraic topology, because of the role the exterior derivative plays in de Rham cohomology: in a cochain complex , the maps (or ''coboundary operators'') ''di'' are often called differentials. Dually, the boundary operators in a chain complex are sometimes called ''codifferentials''.
The properties of the differential also motivate the algebraic notions of a ''derivation'' and a ''differential algebra''.
In mathematics, and more specifically, in differential calculus, the term 'differential' has several interrelated meanings.
| Contents |
| Basic notions |
| Differential geometry |
| Algebraic geometry |
| Other meanings |
Basic notions
★ In traditional approaches to calculus, the differential of a function represents an infinitesimal change in its value. Although this is not a precise notion, there are several ways to make sense of it rigorously.
★ The differential is another name for the Jacobian matrix of partial derivatives of a function from 'R'm to 'R'n (especially when this matrix is viewed as a linear map).
★ More generally, the ''differential or pushforward'' refers to the derivative of a map between smooth manifolds and the pushforward operations it defines. The differential is also used to define the dual concept of pullback.
★ Stochastic calculus provides a notion of stochastic differential and an associated calculus for stochastic processes.
Differential geometry
The notion of a differential motivates several concepts in differential geometry (and differential topology).
★ Differential forms provide a framework which accommodates multiplication and differentiation of differentials.
★ The exterior derivative is a notion of differentiation of differential forms which generalizes the differential of a function (which is a differential 1-form).
★ Pullback is, in particular, a geometric name for the chain rule for composing a map between manifolds with a differential form on the target manifold.
★ Covariant derivatives or differentials provide a general notion for differentiating of vector fields and tensor fields on a manifold, or, more generally, sections of a vector bundle: see Connection (vector bundle). This ultimately leads to the general concept of a connection.
Algebraic geometry
Differentials are also important in algebraic geometry, and there are several important notions.
★ Abelian differentials usually refer to differential one-forms on an algebraic curve or Riemann surface.
★ Quadratic differentials (which behave like "squares" of abelian differentials) are also important in the theory of Riemann surfaces.
★ Kahler differentials provide a general notion of differential in algebraic geometry
Other meanings
The term ''differential'' has also been adopted in homological algebra and algebraic topology, because of the role the exterior derivative plays in de Rham cohomology: in a cochain complex , the maps (or ''coboundary operators'') ''di'' are often called differentials. Dually, the boundary operators in a chain complex are sometimes called ''codifferentials''.
The properties of the differential also motivate the algebraic notions of a ''derivation'' and a ''differential algebra''.
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