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Dissipative Behavior of Some Fully Non-Linear KdV-Type Equations

Mathematical Physics 2007-05-23 v1 math.MP Numerical Analysis

Abstract

The KdV equation can be considered as a special case of the general equation u_{t} + f(u)_{x} - \delta g(u_{xx})_x = 0, \qquad \delta > 0, where f is non-linear and g is linear, namely f(u)=u2/2f(u)=u^2/2 and g(v)=v. As the parameter δ\delta tends to 0, the dispersive behavior of the KdV equation has been throughly investigated . We show through numerical evidence that a completely different, dissipative behavior occurs when g is non-linear, namely when g is an even concave function such as g(v)=vg(v)=-|v| or g(v)=v2g(v)=-v^2. In particular, our numerical results hint that as δ>0\delta -> 0 the solutions converge to the unique entropy solution of the formal limit equation, in total contrast with the solutions of the KdV equation.

Keywords

Cite

@article{arxiv.math-ph/9911019,
  title  = {Dissipative Behavior of Some Fully Non-Linear KdV-Type Equations},
  author = {D. Levy and Y. Brenier},
  journal= {arXiv preprint arXiv:math-ph/9911019},
  year   = {2007}
}

Comments

22 pages, 28 figures