Difference between revisions of "D'Alembert formula"
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| − | + | A formula expressing the solution of the Cauchy problem for the wave equation with one spatial variable. Let the given functions $ \phi $, | |
| + | $ \psi $ | ||
| + | belong, respectively, to the spaces $ C ^ {2} ( - \infty , + \infty ) $ | ||
| + | and $ C ^ {1} ( - \infty , + \infty ) $, | ||
| + | and let $ f( t, x) $ | ||
| + | be continuous together with the first derivative with respect to $ x $ | ||
| + | in the half-plane $ \{ t \geq 0, - \infty < x < + \infty \} $. | ||
| + | Then the classical solution $ u( t, x) $ | ||
| + | in $ \{ t > 0, - \infty < x < \infty \} $ | ||
| + | of the [[Cauchy problem|Cauchy problem]] | ||
| − | + | $$ \tag{1 } | |
| − | + | \frac{\partial ^ {2} u ( t, x) }{\partial t ^ {2} } | |
| + | - a ^ {2} | ||
| − | + | \frac{\partial ^ {2} u ( t, x) }{\partial x ^ {2} } | |
| + | = f( t, x), | ||
| + | $$ | ||
| − | + | $$ \tag{2 } | |
| + | \left . u( t, x) \right | _ {t= 0} = \phi ( x), \left . | ||
| + | \frac{\partial | ||
| + | u ( t, x) }{\partial t } | ||
| + | \right | _ {t=0 } = \psi ( x) , | ||
| + | $$ | ||
| − | + | is expressed by d'Alembert's formula: | |
| − | + | $$ | |
| + | u( t, x) = | ||
| + | \frac{1}{2a} | ||
| + | \int\limits _ { 0 } ^ { t } \int\limits _ {x- a( t- \tau ) } ^ { {x+ } a( t- \tau ) } f ( \tau , \xi ) d \xi d \tau + | ||
| + | $$ | ||
| − | + | $$ | |
| + | + | ||
| − | + | \frac{1}{2a} | |
| − | + | \int\limits _ { x- } at ^ { x+ } at \psi ( \xi ) \ | |
| + | d \xi + | ||
| + | \frac{1}{2} | ||
| + | [ \phi ( x+ at) + \phi ( x- at) ] . | ||
| + | $$ | ||
| + | If the functions $ \phi $ | ||
| + | and $ \psi $ | ||
| + | are given and satisfy the above smoothness conditions on the interval $ \{ | x - x _ {0} | < aT \} $, | ||
| + | and if $ f( t, x) $ | ||
| + | satisfies it in the triangle | ||
| + | $$ | ||
| + | Q _ {x _ {0} } ^ {T} = \{ | x - x _ {0} | < a( T- t) ,\ | ||
| + | t\geq 0 \} , | ||
| + | $$ | ||
| − | + | then d'Alembert's formula gives the unique solution of the problem (1), (2) in $ Q _ {x _ {0} } ^ {T} $. | |
| + | The requirements on the given functions may be weakened if one is interested in solutions in a certain generalized sense. For instance, it follows from d'Alembert's formula that if $ f $ | ||
| + | is integrable with respect to any triangle $ Q _ {x _ {0} } ^ {T} $, | ||
| + | if $ \psi $ | ||
| + | is locally integrable and if $ \phi $ | ||
| + | is continuous, the weak solution of Cauchy's problem (1), (2) may be defined as a uniform limit (in any $ Q _ {x _ {0} } ^ {T} $) | ||
| + | of classical solutions with smooth data and is also expressed by d'Alembert's formula. | ||
| + | The formula was named after J. d'Alembert (1747). | ||
====References==== | ====References==== | ||
| − | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> R. Courant, D. Hilbert, "Methods of mathematical physics. Partial differential equations" , '''2''' , Interscience (1965) (Translated from German)</TD></TR></table> | + | <table><TR><TD valign="top">[1]</TD> <TD valign="top"> V.S. Vladimirov, "Equations of mathematical physics" , MIR (1984) (Translated from Russian)</TD></TR><TR><TD valign="top">[2]</TD> <TD valign="top"> A.N. Tikhonov, A.A. Samarskii, "Partial differential equations of mathematical physics" , '''1–2''' , Holden-Day (1976) (Translated from Russian)</TD></TR> |
| + | <TR><TD valign="top">[a1]</TD> <TD valign="top"> R. Courant, D. Hilbert, "Methods of mathematical physics. Partial differential equations" , '''2''' , Interscience (1965) (Translated from German)</TD></TR></table> | ||
Latest revision as of 13:28, 26 March 2023
A formula expressing the solution of the Cauchy problem for the wave equation with one spatial variable. Let the given functions $ \phi $,
$ \psi $
belong, respectively, to the spaces $ C ^ {2} ( - \infty , + \infty ) $
and $ C ^ {1} ( - \infty , + \infty ) $,
and let $ f( t, x) $
be continuous together with the first derivative with respect to $ x $
in the half-plane $ \{ t \geq 0, - \infty < x < + \infty \} $.
Then the classical solution $ u( t, x) $
in $ \{ t > 0, - \infty < x < \infty \} $
of the Cauchy problem
$$ \tag{1 } \frac{\partial ^ {2} u ( t, x) }{\partial t ^ {2} } - a ^ {2} \frac{\partial ^ {2} u ( t, x) }{\partial x ^ {2} } = f( t, x), $$
$$ \tag{2 } \left . u( t, x) \right | _ {t= 0} = \phi ( x), \left . \frac{\partial u ( t, x) }{\partial t } \right | _ {t=0 } = \psi ( x) , $$
is expressed by d'Alembert's formula:
$$ u( t, x) = \frac{1}{2a} \int\limits _ { 0 } ^ { t } \int\limits _ {x- a( t- \tau ) } ^ { {x+ } a( t- \tau ) } f ( \tau , \xi ) d \xi d \tau + $$
$$ + \frac{1}{2a} \int\limits _ { x- } at ^ { x+ } at \psi ( \xi ) \ d \xi + \frac{1}{2} [ \phi ( x+ at) + \phi ( x- at) ] . $$
If the functions $ \phi $ and $ \psi $ are given and satisfy the above smoothness conditions on the interval $ \{ | x - x _ {0} | < aT \} $, and if $ f( t, x) $ satisfies it in the triangle
$$ Q _ {x _ {0} } ^ {T} = \{ | x - x _ {0} | < a( T- t) ,\ t\geq 0 \} , $$
then d'Alembert's formula gives the unique solution of the problem (1), (2) in $ Q _ {x _ {0} } ^ {T} $. The requirements on the given functions may be weakened if one is interested in solutions in a certain generalized sense. For instance, it follows from d'Alembert's formula that if $ f $ is integrable with respect to any triangle $ Q _ {x _ {0} } ^ {T} $, if $ \psi $ is locally integrable and if $ \phi $ is continuous, the weak solution of Cauchy's problem (1), (2) may be defined as a uniform limit (in any $ Q _ {x _ {0} } ^ {T} $) of classical solutions with smooth data and is also expressed by d'Alembert's formula.
The formula was named after J. d'Alembert (1747).
References
| [1] | V.S. Vladimirov, "Equations of mathematical physics" , MIR (1984) (Translated from Russian) |
| [2] | A.N. Tikhonov, A.A. Samarskii, "Partial differential equations of mathematical physics" , 1–2 , Holden-Day (1976) (Translated from Russian) |
| [a1] | R. Courant, D. Hilbert, "Methods of mathematical physics. Partial differential equations" , 2 , Interscience (1965) (Translated from German) |
How to Cite This Entry:
D'Alembert formula. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=D%27Alembert_formula&oldid=15811
D'Alembert formula. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=D%27Alembert_formula&oldid=15811
This article was adapted from an original article by A.K. Gushchin (originator), which appeared in Encyclopedia of Mathematics - ISBN 1402006098. See original article