An application of the Sum of Squares Decomposition to the L2gain computation for a class of non linear systems

机译：平方和分解法在一类非线性系统的L 2 增益计算中的应用

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This paper presents a new approach for determining the L2gain of affine non-linear systems with polynomial vector fields within the sum of squares framework. The main feature of the proposed approach is that it does not require solving a Hamilton Jacobi Inequality (HJI). The solution to the HJI is done indirectly by solving another inequality augmented with slack variables. This new inequality is much easier to solve than the original HJI since it is linear in the Lyapunov function parameters. Numerical examples are given to illustrates the proposed approach.

机译：本文提出了一种确定平方和框架内具有多项式矢量场的仿射非线性系统的L 2 增益的新方法。所提出的方法的主要特征是它不需要解决汉密尔顿·雅各比不等式（HJI）。 HJI的解决方案是通过解决另一个由松弛变量增加的不等式间接完成的。由于新的不等式在Lyapunov函数参数中是线性的，因此比原始的HJI更容易解决。数值例子说明了该方法。

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来源
《IEE Colloquium on Why aren't we Training Measurement Engineers?, 1992》|1992年|p.6865-6868|共4页
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作者
Prempain E.;
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作者单位

Department of Electrical Engineering Electronics, University of;

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原文格式 PDF
正文语种 eng
中图分类自动化技术、计算机技术;
关键词
H; L; Nonlinear Systems;

机译：H; L;非线性系统;

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An application of the Sum of Squares Decomposition to the L2gain computation for a class of non linear systems

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