On the Characteristic Functions and Dirchlet-Integrable Solutions of Singular Left-Definite Hamiltonian Systems
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Abstract
In this work, a singular left-definite Hamiltonian system is considered and the characteristic-matrix theory for this Hamiltonian system is constructed. Using the results of this theory we introduce a lower bound for the number of Dirichlet-integrable solutions. Moreover we share a relation between the kernel of the solution of the nonhomogeneous boundary value problem and the characteristic-matrix.
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Left-Definite Equations, Hamiltonian Systems, Dirichlet-Integrable Solutions, Left-definite equations, Hamiltonian systems, Dirichlet-integrable solutions.
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Citation
Bairamov, Elgiz; Taş, Kenan; Uğurlu, Ekin (2024). "On the characteristic functions and Dirchlet-integrable solutions of singular left-definite Hamiltonian systems", Quaestiones Mathematicae, Vol. 47, No. 5, pp. 983-995.
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1
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Volume
47
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5
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983
End Page
995
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Scopus : 3
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3
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3
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