利用混合单调分解方法研究离散非线性、时变凸多面体系统族的线性状态约束集合的鲁棒正不变性。
In this paper, the robust positive invariance of given linear state constraint sets of uncertain discrete time systems is studied by means of the mixed monotone decomposition method.
本文中,提出了若干个离散的谱问题,导出了相应的孤立子方程,然后利用屠格式对方程族的结构作了近一步的研究。
In this paper we formulated some discrete integrable systems and gave the corresponding lattice equations and its Hamilton structure by means of the trace identity.
本文中,提出了若干个离散的等谱特征问题,导出了相应的1 + 1、2 + 1维孤立子方程,并利用屠格式对方程族的结构作了近一步的研究。
In this paper, we formulated some discrete integrable systems and gave the corresponding lattice equations in 1 + 1, 2 + 1 dimensions and associated Hamilton structure by means of the trace identity.
在第二个问题中,我们给出了在离散的情形下,指数族势函数严凸的充分必要条件。
In the second we give the necessary and sufficient conditions for strict convexity of power function of exponential family in the discrete case.
本文利用混合单调分解方法来研究离散时滞线性凸多面体系统族的线性状态约束集合的鲁棒正不变性。
In this paper, the robust positive invariance of given linear state constraint sets of uncertain discrete-time delay systems is studied by means of the mixed monotone decomposition method.
本文利用混合单调分解方法来研究离散时滞线性凸多面体系统族的线性状态约束集合的鲁棒正不变性。
In this paper, the robust positive invariance of given linear state constraint sets of uncertain discrete-time delay systems is studied by means of the mixed monotone decomposition method.
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