The Stability of Saturated Linear Dynamical Systems Is Undecidable
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摘要
We prove that several global properties (global convergence, global asymptotic stability, mortality, and nilpotence) of particular classes of discrete time dynamical systems are undecidable. Such results had been known only for point-to-point properties. We prove these properties undecidable for saturated linear dynamical systems, and for continuous piecewise affine dynamical systems in dimension 3. We also describe some consequences of our results on the possible dynamics of such systems.
论文关键词:dynamical systems,saturated linear systems,piecewise affine systems,hybrid systems,mortality,stability,decidability
论文评审过程:Received 21 September 1999, Revised 3 October 2000, Available online 25 May 2002.
论文官网地址:https://doi.org/10.1006/jcss.2000.1737