Interior controllability of a broad class of reaction diffusion equations.
Leiva, Hugo, Quintana, Yamilet (2009)
Mathematical Problems in Engineering
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Leiva, Hugo, Quintana, Yamilet (2009)
Mathematical Problems in Engineering
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Jerzy Klamka (1996)
Kybernetika
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Sergei Avdonin, Marius Tucsnak (2001)
ESAIM: Control, Optimisation and Calculus of Variations
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We study the simultaneously reachable subspace for two strings controlled from a common endpoint. We give necessary and sufficient conditions for simultaneous spectral and approximate controllability. Moreover we prove the lack of simultaneous exact controllability and we study the space of simultaneously reachable states as a function of the position of the joint. For each type of controllability result we give the sharp controllability time.
Larez, Hanzel, Leiva, Hugo (2009)
Boundary Value Problems [electronic only]
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Sergei Avdonin, Marius Tucsnak (2010)
ESAIM: Control, Optimisation and Calculus of Variations
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We study the simultaneously reachable subspace for two strings controlled from a common endpoint. We give necessary and sufficient conditions for simultaneous spectral and approximate controllability. Moreover we prove the lack of simultaneous exact controllability and we study the space of simultaneously reachable states as a function of the position of the joint. For each type of controllability result we give the sharp controllability time.
Wang, Lianwen (2005)
Journal of Applied Mathematics and Stochastic Analysis
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Sergei Avdonin, Abdon Choque Rivero, Luz de Teresa (2013)
International Journal of Applied Mathematics and Computer Science
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We study the exact boundary controllability of two coupled one dimensional wave equations with a control acting only in one equation. The problem is transformed into a moment problem. This framework has been used in control theory of distributed parameter systems since the classical works of A.G. Butkovsky, H.O. Fattorini and D.L. Russell in the late 1960s to the early 1970s. We use recent results on the Riesz basis property of exponential divided differences.
Karine Beauchard (2005-2006)
Séminaire Équations aux dérivées partielles
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One considers a quantum particle in a 1D moving infinite square potential well. It is a nonlinear control system in which the state is the wave function of the particle and the control is the acceleration of the potential well. One proves the local controllability around any eigenstate, and the steady state controllability (controllability between eigenstates) of this control system. In particular, the wave function can be moved from one eigenstate to another one, exactly and in finite...