自反Banach空间上的反馈系统——线性化

M. Khelifa
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引用次数: 0

摘要

我们工作的目的是公式化和证明由实自反Banach空间上定义的单调极大算子和半连续算子描述的非线性反馈系统的正规性、Lipschitz连续性的结果,以及假设为非线性的反馈系统[a,B]的解在零邻域内由另一个线性的解近似的结果,这种近似使我们能够获得对解的适当估计。这些估计对此类系统的鲁棒稳定性和灵敏度的研究具有重要影响,参见[1][2][3]。然后我们考虑线性FS,并证明,如果,具有FS[A,B]的相应解,并且对应于中的给定(u,v)。存在,,正实常数,这样。这些结果是定理3.1,…,3.3的主题。这些定理的证明是基于我们的引理3.2,…,3.5,根据关于A和B的假设,致力于算子I+BA和的逆的存在性。根据本文获得并证明的结果,在一般Banach空间中给出了[4]中的结果在Hilbert空间H上的扩展和[5]中的那些结果在扩展Hilbert空间上的扩展。
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Feedback Systems on a Reflexive Banach Space—Linearization
The aim of our work is to formulate and demonstrate the results of the normality, the Lipschitz continuity, of a nonlinear feedback system described by the monotone maximal operators and hemicontinuous, defined on real reflexive Banach spaces, as well as the approximation in a neighborhood of zero, of solutions of a feedback system [A,B] assumed to be non-linear, by solutions of another linear, This approximation allows us to obtain appropriate estimates of the solutions. These estimates have a significant effect on the study of the robust stability and sensitivity of such a system see [1] [2] [3]. We then consider a linear FS , and prove that, if ; , with the respective solutions of FS’s [A,B] and corresponding to the given (u,v) in . There exists,, positive real constants such that, . These results are the subject of theorems 3.1, ... , 3.3. The proofs of these theorems are based on our lemmas 3.2, ... , 3.5, devoted according to the hypotheses on A and B, to the existence of the inverse of the operator I+BA and . The results obtained and demonstrated along this document, present an extension in general Banach space of those in [4] on a Hilbert space H and those in [5] on a extended Hilbert space .
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