Difference between revisions of "Generalized function, derivative of a"
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A weak extension of the operation of ordinary [[Differentiation|differentiation]]. Let $ f $ | A weak extension of the operation of ordinary [[Differentiation|differentiation]]. Let $ f $ | ||
− | be a [[Generalized function|generalized function]], $ f \in D ^ \prime ( O) $. | + | be a [[Generalized function|generalized function]], $ f \in \mathcal D ^ \prime ( O) $. |
The generalized (weak) derivative | The generalized (weak) derivative | ||
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( - 1 ) ^ {| \alpha | } | ( - 1 ) ^ {| \alpha | } | ||
( f , D ^ \alpha \phi ) ,\ \ | ( f , D ^ \alpha \phi ) ,\ \ | ||
− | \phi \in D ( O) . | + | \phi \in \mathcal D ( O) . |
$$ | $$ | ||
Since the operation $ \phi \mapsto (- 1) ^ {| \alpha | } D ^ \alpha \phi $ | Since the operation $ \phi \mapsto (- 1) ^ {| \alpha | } D ^ \alpha \phi $ | ||
− | is linear and continuous from $ | + | is linear and continuous from $ \mathcal D ( O) $ |
− | into $ | + | into $ \mathcal D ( O) $, |
the functional $ D ^ \alpha f $ | the functional $ D ^ \alpha f $ | ||
− | defined by the right-hand side of (*) is a generalized function in $ | + | defined by the right-hand side of (*) is a generalized function in $ \mathcal D ^ \prime ( O) $. |
If $ f \in C ^ {p} ( O) $, | If $ f \in C ^ {p} ( O) $, | ||
then $ D ^ \alpha f \in C ^ {p - | \alpha | } ( O) $ | then $ D ^ \alpha f \in C ^ {p - | \alpha | } ( O) $ | ||
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with $ | \alpha | \leq p $. | with $ | \alpha | \leq p $. | ||
− | The following properties hold for the derivatives of a generalized function: the operation $ f \mapsto D ^ \alpha f $ | + | The following properties hold for the derivatives of a generalized function: the operation $ f \mapsto \mathcal D ^ \alpha f $ |
− | is linear and continuous from $ D ^ \prime ( O) $ | + | is linear and continuous from $ \mathcal D ^ \prime ( O) $ |
− | into $ | + | into $ \mathcal D ^ \prime ( O) $; |
− | any generalized function in $ | + | any generalized function in $ \mathcal D ^ \prime ( O) $ |
is infinitely differentiable (in the generalized sense); the result of differentiation does not depend on the order; the [[Leibniz formula|Leibniz formula]] is valid for the differentiation of a product $ af $, | is infinitely differentiable (in the generalized sense); the result of differentiation does not depend on the order; the [[Leibniz formula|Leibniz formula]] is valid for the differentiation of a product $ af $, | ||
when $ a \in C ^ \infty ( O) $; | when $ a \in C ^ \infty ( O) $; | ||
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Let $ f \in L _ { \mathop{\rm loc} } ^ {1} ( O) $. | Let $ f \in L _ { \mathop{\rm loc} } ^ {1} ( O) $. | ||
− | It may happen that a certain generalized derivative can be identified with some $ L _ { \mathop{\rm loc} } ^ {1} ( O) $- | + | It may happen that a certain generalized derivative can be identified with some $ L _ { \mathop{\rm loc} } ^ {1} ( O) $-function. In this case $ D ^ \alpha f ( x) $ |
− | function. In this case $ D ^ \alpha f ( x) $ | ||
is a [[Generalized derivative|generalized derivative]] of function type. | is a [[Generalized derivative|generalized derivative]] of function type. | ||
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2) The general solution of the equation $ u ^ \prime = 0 $ | 2) The general solution of the equation $ u ^ \prime = 0 $ | ||
− | in the class $ D ^ \prime $ | + | in the class $ \mathcal D ^ \prime $ |
is an arbitrary constant. | is an arbitrary constant. | ||
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$$ | $$ | ||
− | converges in $ | + | converges in $ \mathcal D ^ \prime $ |
− | and it can be differentiated term-by-term in $ | + | and it can be differentiated term-by-term in $ \mathcal D ^ \prime $ |
infinitely many times. | infinitely many times. | ||
Latest revision as of 08:03, 25 April 2022
A weak extension of the operation of ordinary differentiation. Let $ f $
be a generalized function, $ f \in \mathcal D ^ \prime ( O) $.
The generalized (weak) derivative
$$ D ^ \alpha f = \ \frac{\partial ^ {| \alpha | } f }{\partial x _ {1} ^ {\alpha _ {1} } \dots \partial x _ {n} ^ {\alpha _ {n} } } ,\ \ | \alpha | = \alpha _ {1} + \dots + \alpha _ {n} , $$
of order $ \alpha = ( \alpha _ {1} \dots \alpha _ {n} ) $ is defined by the equation
$$ \tag{* } ( D ^ \alpha f , \phi ) = \ ( - 1 ) ^ {| \alpha | } ( f , D ^ \alpha \phi ) ,\ \ \phi \in \mathcal D ( O) . $$
Since the operation $ \phi \mapsto (- 1) ^ {| \alpha | } D ^ \alpha \phi $ is linear and continuous from $ \mathcal D ( O) $ into $ \mathcal D ( O) $, the functional $ D ^ \alpha f $ defined by the right-hand side of (*) is a generalized function in $ \mathcal D ^ \prime ( O) $. If $ f \in C ^ {p} ( O) $, then $ D ^ \alpha f \in C ^ {p - | \alpha | } ( O) $ for all $ \alpha $ with $ | \alpha | \leq p $.
The following properties hold for the derivatives of a generalized function: the operation $ f \mapsto \mathcal D ^ \alpha f $ is linear and continuous from $ \mathcal D ^ \prime ( O) $ into $ \mathcal D ^ \prime ( O) $; any generalized function in $ \mathcal D ^ \prime ( O) $ is infinitely differentiable (in the generalized sense); the result of differentiation does not depend on the order; the Leibniz formula is valid for the differentiation of a product $ af $, when $ a \in C ^ \infty ( O) $; and $ \supp D ^ \alpha f \subset \supp f $.
Let $ f \in L _ { \mathop{\rm loc} } ^ {1} ( O) $. It may happen that a certain generalized derivative can be identified with some $ L _ { \mathop{\rm loc} } ^ {1} ( O) $-function. In this case $ D ^ \alpha f ( x) $ is a generalized derivative of function type.
Examples.
1) $ \theta ^ \prime = \delta $, where $ \theta $ is the Heaviside function and $ \delta $ is the Dirac function (cf. Delta-function for both).
2) The general solution of the equation $ u ^ \prime = 0 $ in the class $ \mathcal D ^ \prime $ is an arbitrary constant.
3) The trigonometric series
$$ \sum _ {k = - \infty } ^ \infty a _ {k} e ^ {ikx} ,\ \ | a _ {k} | \leq A ( 1 + | k | ) ^ {m} , $$
converges in $ \mathcal D ^ \prime $ and it can be differentiated term-by-term in $ \mathcal D ^ \prime $ infinitely many times.
References
[1] | L. Schwartz, "Théorie des distributions" , 1 , Hermann (1950) MR0035918 Zbl 0037.07301 |
[2] | S.L. Sobolev, "Applications of functional analysis in mathematical physics" , Amer. Math. Soc. (1963) (Translated from Russian) MR0165337 Zbl 0123.09003 |
Comments
References
[a1] | K. Yosida, "Functional analysis" , Springer (1980) pp. Chapt. 8, Sect. 4; 5 MR0617913 Zbl 0435.46002 |
[a2] | L.V. Hörmander, "The analysis of linear partial differential operators" , 1 , Springer (1983) MR0717035 MR0705278 Zbl 0521.35002 Zbl 0521.35001 |
Generalized function, derivative of a. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Generalized_function,_derivative_of_a&oldid=47071