Weyl-Titchmarsh theory for time scale symplectic systems on half line.
Šimon Hilscher, Roman, Zemánek, Petr (2011)
Abstract and Applied Analysis
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Displaying similar documents to “Weyl-Titchmarsh theory for Hamiltonian dynamic systems.”
Weyl-Titchmarsh theory for time scale symplectic systems on half line.
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In this paper, the output synchronization control is considered for multi-agent port-Hamiltonian systems with link dynamics. By using Hamiltonian energy function and Casimir function comprehensively, the design method is proposed to overcome the difficulties taken by link dynamics. The Hamiltonian function is used to handle the dynamic of agent, while the Casimir function is constructed to deal with the dynamic of link. Thus the Lyapunov function is generated by modifying the Hamiltonian...
Friedrichs extension of operators defined by linear Hamiltonian systems on unbounded interval
Roman Šimon Hilscher, Petr Zemánek (2010)
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In this paper we consider a linear operator on an unbounded interval associated with a matrix linear Hamiltonian system. We characterize its Friedrichs extension in terms of the recessive system of solutions at infinity. This generalizes a similar result obtained by Marletta and Zettl for linear operators defined by even order Sturm-Liouville differential equations.
A simple proof of the non-integrability of the first and the second Painlevé equations
Henryk Żołądek (2011)
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The first and the second Painlevé equations are explicitly Hamiltonian with time dependent Hamilton function. By a natural extension of the phase space one gets corresponding autonomous Hamiltonian systems in ℂ⁴. We prove that the latter systems do not have any additional algebraic first integral. In the proof equations in variations with respect to a parameter are used.
By Magri's theorem, self-dual gravity is completely integrable.
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