Solving PDEs with mixed derivatives

10 En. 2023
1 Respuesta
Actualizado a las 6 Abr. 2023
8 Visualizaciones (30 días)

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Suppose I have an equation of the form:
Can I use pdepe to solve that equation as is, or do I have to do a co-ordinate transformation first to get rid of the mixed derivative?

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Torsten
Torsten el 10 de En. de 2023
Editada: Torsten el 10 de En. de 2023
I doubt that by a coordinate transformation, you can establish the form
dT'/dt' = a*d^2T'/dx'^2 + b*dT'/dx' + c
that would be needed to apply pdepe since your equation has a hyperbolic part (d^2T/dt*dx).
But what do you suggest ?
Matthew Hunt
Matthew Hunt el 10 de En. de 2023
Just use
and look for the condition where there is no mixed derivatives.
Torsten
Torsten el 11 de En. de 2023
Editada: Torsten el 11 de En. de 2023
And what do you get as PDE after applying the transformation ?
Is it of the form
dT'/dt' = a*d^2T'/dx'^2 + b*dT'/dx' + c
solvable for pdepe ?
If yes: you can apply pdepe, if no: not.

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Respuestas (1)

Swaraj
Swaraj el 6 de Abr. de 2023

0 votos

Hi,
I understand you want to use “pdepe” to solve PDE with mixed derivatives.
“pdepe” is normally used to solve 1-D parabolic and elliptic PDEs and not for mixed derivatives.
I would suggest you to go through the below documentation to understand when to use “pdepe” for solving PDE’s.
Solve 1-D parabolic and elliptic PDEs - MATLAB pdepe (mathworks.com)
I hope it helps.
Thanks!!

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Preguntada:

Matthew Hunt
Matthew Hunt
el 10 de En. de 2023

Respondida:

Swaraj
Swaraj
el 6 de Abr. de 2023

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