Abstract
A truncation for the Laurent series in the Painlevé analysis of the KdV equation is restudied. When the truncation occurs the singular manifold satisfies two compatible fourth-order PDEs, which are homogeneous of degree 3. Both of the PDEs can be factored in the operator sense. The common factor is a third-order PDE, which is homogeneous of degree 2. The first few invariant manifolds of the third-order PDE are studied. We find that the invariant manifolds of the third-order PDE can be obtained by factoring the invariant manifolds of the KdV equation. A numerical solution of the third-order PDE is also presented. The solution reveals some interesting facts about the third-order PDE.
| Original language | English |
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| Pages (from-to) | 2735-2738 |
| Number of pages | 4 |
| Journal | Chinese Physics Letters |
| Volume | 25 |
| Issue number | 8 |
| DOIs | |
| State | Published - 1 Aug 2008 |
| Externally published | Yes |