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Article Navigation > Applied Mathematics and Mechanics > 1995 > 16(3): 263-266

Zhu Chang-jiang. Intial Value Problem for High Dimensional Dynamic Systems[J]. Applied Mathematics and Mechanics, 1995, 16(3): 263-266.

Citation:

Zhu Chang-jiang. Intial Value Problem for High Dimensional Dynamic Systems[J]. Applied Mathematics and Mechanics, 1995, 16(3): 263-266.

Zhu Chang-jiang. Intial Value Problem for High Dimensional Dynamic Systems[J]. Applied Mathematics and Mechanics, 1995, 16(3): 263-266.

Citation:

Zhu Chang-jiang. Intial Value Problem for High Dimensional Dynamic Systems[J]. Applied Mathematics and Mechanics, 1995, 16(3): 263-266.

Intial Value Problem for High Dimensional Dynamic Systems

Zhu Chang-jiang

Inst.of Math. Scis., Academia Sinica, Wuhan 430071

Received Date: 1994-07-24
Publish Date: 1995-03-15

Abstract

In this paper, we prove the existence of the global classical solutions and the uniform stability of the zero solution to the initial value problem for a class of high dimensional dynamic systems which contain the degenerate case.
- maximum principle,
- global classical solution,
- uniform stability

References

[1]	Lefschetz,S.,Stability of Nonlinear Control SHstems,Academie PrPSS,New York (1965).
[2]	Liao Xiao-xin,Absolute stability of general Lurie control systems,Acta Mathematica Scieniia,11(1991),1-12.

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