Difference between revisions of "Duhamel integral"
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A representation of the solution of the [[Cauchy problem|Cauchy problem]] (or of a mixed problem) for an inhomogeneous linear partial differential equation with homogeneous boundary conditions by means of the solution of the corresponding problem for the homogeneous equation. Consider the equation | A representation of the solution of the [[Cauchy problem|Cauchy problem]] (or of a mixed problem) for an inhomogeneous linear partial differential equation with homogeneous boundary conditions by means of the solution of the corresponding problem for the homogeneous equation. Consider the equation | ||
+ | $$ | ||
+ | (1) \qquad | ||
+ | \frac{\partial^{2} u(t,x)}{\partial t^{2}} + L[u(t,x)] = f(t,x), \qquad x \in \mathbf{R}^{n}, ~ t > 0, | ||
+ | $$ | ||
+ | where $ L $ is a linear differential operator with coefficients independent of $ t $, containing derivatives in $ t $ of order not exceeding $ 1 $. The Cauchy problem for (1) is posed with the initial conditions | ||
+ | $$ | ||
+ | (2) \qquad | ||
+ | u(t,x)|_{t = 0} = 0 \qquad \text{and} \qquad | ||
+ | \frac{\partial u(t,x)}{\partial t} \Bigg|_{t = 0} = 0. | ||
+ | $$ | ||
− | + | Let the sufficiently smooth function $ v(t,x;\tau) $, where $ t \geq \tau \geq 0 $ and $ x \in \mathbf{R}^{n} $, for $ t > \tau $, be a solution of the homogeneous equation | |
− | + | $$ | |
− | + | \frac{\partial^{2} v(t,x;\tau)}{\partial t^{2}} + L[v(t,x;\tau)] = 0, | |
− | + | $$ | |
− | + | and let it satisfy, for $ t = \tau $, the initial conditions | |
− | + | $$ | |
− | Let the sufficiently smooth function | + | v(t,x;\tau)|_{t = \tau} = 0 \qquad \text{and} \qquad |
− | + | \frac{\partial v(t,x;\tau)}{\partial t} \Bigg|_{t = \tau} = f(\tau,x). | |
− | + | $$ | |
− | + | Then the solution of the Cauchy problem (1) + (2) is given by the Duhamel integral | |
− | and let it satisfy, for | + | $$ |
− | + | u(t,x) = \int_{0}^{t} v(t,x;\tau) ~ \mathrm{d}{\tau}. | |
− | + | $$ | |
− | + | This theorem, known as '''Duhamel’s principle''', is an analogue of the method of variation of constants. | |
− | Then the solution of the Cauchy problem (1) | ||
− | |||
− | |||
− | |||
− | This theorem, known as | ||
A similar construction can be used for the Cauchy problem with a homogeneous initial condition for the equation | A similar construction can be used for the Cauchy problem with a homogeneous initial condition for the equation | ||
− | + | $$ | |
− | + | \frac{\partial u(t,x)}{\partial t} + M[u(t,x)] = f(t,x), \qquad x \in \mathbf{R}^{n}, ~ t > 0, | |
− | + | $$ | |
− | where | + | where $ M $ is a linear differential operator with coefficients independent of $ t $, containing derivatives with respect to the variable $ x $ only. |
The solution of the Cauchy problem with homogeneous initial conditions for the inhomogeneous heat equation is expressed by the Duhamel integral | The solution of the Cauchy problem with homogeneous initial conditions for the inhomogeneous heat equation is expressed by the Duhamel integral | ||
− | + | $$ | |
− | + | u(t,x) = \int_{0}^{t} \int_{\mathbf{R}^{n}} [4 \pi (t - \tau)]^{- n / 2} e^{- \| x - \xi \|^{2} / 4(t - \tau)} f(\tau,\xi) ~ \mathrm{d}{\xi} ~ \mathrm{d}{\tau}. | |
− | + | $$ | |
− | For the wave equation if | + | For the wave equation, if $ n = 1 $, one has |
− | + | $$ | |
− | + | u(t,x) = \int_{0}^{t} \int_{x - (t - \tau)}^{x + (t - \tau)} f(\tau,\xi) ~ \mathrm{d}{\xi}. | |
+ | $$ | ||
The integral is named after J. Duhamel. | The integral is named after J. Duhamel. | ||
====References==== | ====References==== | ||
− | |||
+ | <table> | ||
+ | <TR><TD valign="top">[1]</TD><TD valign="top"> | ||
+ | A.N. [A.N. Tikhonov] Tichonoff, A.A. Samarskii, “Differentialgleichungen der mathematischen Physik”, Deutsch. Verlag Wissenschaft (1959). (Translated from Russian)</TD></TR> | ||
+ | <TR><TD valign="top">[2]</TD><TD valign="top"> | ||
+ | F. John, “Planar waves and spherical means as applied to partial differential equations”, Interscience (1955).</TD></TR> | ||
+ | </table> | ||
+ | ====References==== | ||
− | + | <table> | |
− | + | <TR><TD valign="top">[a1]</TD><TD valign="top"> | |
− | + | H.S. Carslaw, J.C. Jaeger, “Conduction of heat in solids”, Clarendon Press (1959).</TD></TR> | |
− | + | </table> | |
− | <table><TR><TD valign="top">[a1]</TD> <TD valign="top"> |
Latest revision as of 06:54, 3 March 2017
A representation of the solution of the Cauchy problem (or of a mixed problem) for an inhomogeneous linear partial differential equation with homogeneous boundary conditions by means of the solution of the corresponding problem for the homogeneous equation. Consider the equation $$ (1) \qquad \frac{\partial^{2} u(t,x)}{\partial t^{2}} + L[u(t,x)] = f(t,x), \qquad x \in \mathbf{R}^{n}, ~ t > 0, $$ where $ L $ is a linear differential operator with coefficients independent of $ t $, containing derivatives in $ t $ of order not exceeding $ 1 $. The Cauchy problem for (1) is posed with the initial conditions $$ (2) \qquad u(t,x)|_{t = 0} = 0 \qquad \text{and} \qquad \frac{\partial u(t,x)}{\partial t} \Bigg|_{t = 0} = 0. $$
Let the sufficiently smooth function $ v(t,x;\tau) $, where $ t \geq \tau \geq 0 $ and $ x \in \mathbf{R}^{n} $, for $ t > \tau $, be a solution of the homogeneous equation $$ \frac{\partial^{2} v(t,x;\tau)}{\partial t^{2}} + L[v(t,x;\tau)] = 0, $$ and let it satisfy, for $ t = \tau $, the initial conditions $$ v(t,x;\tau)|_{t = \tau} = 0 \qquad \text{and} \qquad \frac{\partial v(t,x;\tau)}{\partial t} \Bigg|_{t = \tau} = f(\tau,x). $$ Then the solution of the Cauchy problem (1) + (2) is given by the Duhamel integral $$ u(t,x) = \int_{0}^{t} v(t,x;\tau) ~ \mathrm{d}{\tau}. $$ This theorem, known as Duhamel’s principle, is an analogue of the method of variation of constants.
A similar construction can be used for the Cauchy problem with a homogeneous initial condition for the equation $$ \frac{\partial u(t,x)}{\partial t} + M[u(t,x)] = f(t,x), \qquad x \in \mathbf{R}^{n}, ~ t > 0, $$ where $ M $ is a linear differential operator with coefficients independent of $ t $, containing derivatives with respect to the variable $ x $ only.
The solution of the Cauchy problem with homogeneous initial conditions for the inhomogeneous heat equation is expressed by the Duhamel integral $$ u(t,x) = \int_{0}^{t} \int_{\mathbf{R}^{n}} [4 \pi (t - \tau)]^{- n / 2} e^{- \| x - \xi \|^{2} / 4(t - \tau)} f(\tau,\xi) ~ \mathrm{d}{\xi} ~ \mathrm{d}{\tau}. $$ For the wave equation, if $ n = 1 $, one has $$ u(t,x) = \int_{0}^{t} \int_{x - (t - \tau)}^{x + (t - \tau)} f(\tau,\xi) ~ \mathrm{d}{\xi}. $$
The integral is named after J. Duhamel.
References
[1] | A.N. [A.N. Tikhonov] Tichonoff, A.A. Samarskii, “Differentialgleichungen der mathematischen Physik”, Deutsch. Verlag Wissenschaft (1959). (Translated from Russian) |
[2] | F. John, “Planar waves and spherical means as applied to partial differential equations”, Interscience (1955). |
References
[a1] | H.S. Carslaw, J.C. Jaeger, “Conduction of heat in solids”, Clarendon Press (1959). |
Duhamel integral. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Duhamel_integral&oldid=40213