I want to show some users of a piece of software some solutions of one-dimension boundary value problems (can also be initial value problems). I'm after a collection of problems whose solutions are very interesting or the BVP are of a particularly interesting nature. The problems can be linear or non-linear. Does anyone have any suggests?
One dimensional boundary value problems showing interesting behaviour
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0What do you mean by 1D BVP? Is it only ODEs or PDEs in 1D space + time that you are talking about? In the latter case, it is clearer to call them *initial-boundary value problems*. – 2011-01-29
2 Answers
This(site about boundary value problems) should be useful. Some of the interesting boundary value problems they list are the following:
- Heat Equation
- Wave Equation
- Laplace Equation
- Poisson Equation
- Schrodigner's Equation
In terms of the initial value problem, a large class of interesting 1-dimensional questions arise from studying various approximations to surface waves starting from fundamental equations of fluid dynamics.
The Korteweg-de Vries equation and its cousins gKdV and mKdV all lead to demonstrations of a competition between cohesive self-interaction that leads to soliton formation, and dispersive wave-like phenomenon.
(What is especially interesting is to look at the purely dispersive part of the KdV equation $ \partial_t \phi + \partial_x^3 \phi = 0 $ and the purely transport part of the equation $ \partial_t \phi + \phi\partial_x\phi = 0 $ and note their characteristic behaviours. Then compare it against various different initial data for the KdV equation.)
You can also consider looking at the Benjamin-Bona-Mahony equation, which shows off some long wavelength behaviour (in constrast to the KdV solitons, which tends to be more spatially concentrated).