Eigenvalues and eigenvectors of semigroup generators obtained from diagonal generators by feedback

IF 0.6 Q4 COMPUTER SCIENCE, INFORMATION SYSTEMS
G. Weiss, Cheng-Zhong Xu
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引用次数: 12

Abstract

We study infinite-dimensional well-posed linear systems with output feedback such that the closed-loop system is well-posed. The generator A of the open-loop system is assumed to be diagonal, i.e., the state space X (a Hilbert space) has a Riesz basis consisting of eigenvectors of A. We investigate when the closed-loop generator A is Riesz spectral, i.e, its generalized eigenvectors form a Riesz basis in X. We construct a new Riesz basis in X using the sequence of eigenvectors of A and the control operator B. If this new basis is, in a certain sense, close to a subset of the generalized eigenvectors of A , then we conclude that A is Riesz spectral. This approach leads to several results on Riesz spectralness of A where the closed-loop eigenvectors need not be computed. We illustrate the usefulness of our results through several examples concerning the stabilization of systems described by partial differential equations in one space dimension. For the systems in the examples we show that the closed-loop generator is Riesz spectral. Our method allows us to simplify long computations which were necessary otherwise.
对角生成子反馈得到半群生成子的特征值和特征向量
我们研究具有输出反馈的无限维适定线性系统,使得闭环系统是适定的。生成器的一个开环系统被认为是对角线,例如,状态空间X(希尔伯特空间)的黎兹基组成的特征向量A我们研究闭环生成器是黎兹光谱时,也就是说,其广义特征向量形式黎兹的基础上在X,我们构造一个新的黎兹依据X使用的特征向量序列和控制操作符b。如果这个新基础,在某种意义上,接近的广义特征向量的一个子集,那么我们可以得出A是Riesz谱。这种方法可以得到不需要计算闭环特征向量的Riesz谱的几个结果。我们通过几个关于一维空间中用偏微分方程描述的系统的稳定性的例子来说明我们的结果的有用性。对于例子中的系统,我们证明了闭环发生器是Riesz谱。我们的方法使我们可以简化冗长的计算,否则这些计算是必要的。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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来源期刊
Communications in Information and Systems
Communications in Information and Systems COMPUTER SCIENCE, INFORMATION SYSTEMS-
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