The Stability of Saturated Linear Dynamical Systems Is Undecidable

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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 three. We also describe some consequences of our results on the possible dynamics of such systems.

Vincent D. Blondel, Olivier Bournez, Pascal Koiran

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Dynamical Systems | Global Asymptotic Stability | STACS 2000 | Theoretical Computer Science | Time Dynamical Systems |

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Added	25 Aug 2010
Updated	25 Aug 2010
Type	Conference
Year	2000
Where	STACS
Authors	Vincent D. Blondel, Olivier Bournez, Pascal Koiran, John N. Tsitsiklis

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The Stability of Saturated Linear Dynamical Systems Is Undecidable

Dynamical Systems | Global Asymptotic Stability | STACS 2000 | Theoretical Computer Science | Time Dynamical Systems |

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