Lax 对
![{\displaystyle [L,M]=LM-ML}](../I/4442fc49e69e34457dd4954837a93898d39a25e9.svg)
![{\displaystyle L_{t}+[L,M]=0}](../I/11ff5d0ef6106bf32f42a1dd79f67c27591ea0ba.svg)
高维Lax对
1972年V.E.Zakharov,A.B.Shabat,将Lax对推广到高维[2]
对于两个 线性方程
其中A、B是 n x n 维矩阵; 或者更一般地,A和B可以是李代数g的元素; g可以是无限维的,参见 例如 [3]及其中的参考文献 。
定义 为两个 线性方程 的相容条件。
![{\displaystyle A_{t}-B_{x}+[A,B]=0}](../I/2c1f7102f7058dd7790af8fb904e33b3733d26d0.svg)
参考文献
- Inna p217
- Inna p218
- Sergyeyev A. "New integrable (3+1)-dimensional systems and contact geometry", Lett. Math. Phys. 108 (2018), no. 2, 359-376, arXiv:1401.2122 doi: 10.1007/s11005-017-1013-4
- Inna Shingareva, Carlos Lizarraga-Celaya, Solving Nonlinear Partial Differential Equations with Maple and Mathematica, Springer Wien New York
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