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I. Kiguradze, T. Chanturia (1992)
Asymptotic Properties of Solutions of Nonautonomous Ordinary Differential Equations
Functional analysis. (Russian) Nauka, Moscow, 1977. (Received 08.12.1993) Authors' addresses: I. Kiguradze A. Razmadze Mathematical Institute Georgian Academy of Sciences 1, Rukhadze St
(1986)
On a boundary value problem with the condition at infinity for ordinary differential equations of higher orders
R. Usmani (1967)
Numerical solution of boundary value problems in ordinary differential equations
Martin Braun (1976)
Differential equations and their applications
I. Kiguradze, D. Chichua (1995)
On proper oscillatory and vanishing-at-infinity solutions of differential equations with a deviating argumentGeorgian Mathematical Journal, 2
For the functional differential equation u ( n ) ( t ) = ƒ( u )( t ) we have established the sufficient conditions for solvability and unique solvability of the boundary value problems and where n ≥ 2, m is the integer part of , c i ∈ R , and ƒ is the continuous operator acting from the space of ( n – 1)-times continuously differentiable functions given on an interval 0, +∞ into the space of locally Lebesgue integrable functions.
Georgian Mathematical Journal – de Gruyter
Published: Apr 1, 1995
Keywords: Functional differential equation; boundary value problem; integral condition
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