A constructive approach to boundary value problems with state-dependent impulses

We investigate the non-linear system of ordinary differential equationsu′(t)=f(t,u(t)),a.e.t∈[a,b],subject to the state-dependent impulse conditionu(t+)−u(t−)=γ(u(t−))fort∈(a,b)suchthatg(t,u(t−))=0and the linear two-point boundary conditionAu(a)+Cu(b)=d.Here, −∞<a<b<∞,f and γ are given cont...

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Bibliographic Details
Published inApplied mathematics and computation Vol. 274; pp. 726 - 744
Main Authors Rachůnková, Irena, Rachůnek, Lukáš, Rontó, András, Rontó, Miklós
Format Journal Article
LanguageEnglish
Published Elsevier Inc 01.02.2016
Subjects
Impulse effect
Non-linear system of differential equations
Parameterization
Successive approximations
Variable jumps
34B15
34B37
Variable jumps
Impulse effect
Non-linear system of differential equations
Parameterization
Successive approximations
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Summary:We investigate the non-linear system of ordinary differential equationsu′(t)=f(t,u(t)),a.e.t∈[a,b],subject to the state-dependent impulse conditionu(t+)−u(t−)=γ(u(t−))fort∈(a,b)suchthatg(t,u(t−))=0and the linear two-point boundary conditionAu(a)+Cu(b)=d.Here, −∞<a<b<∞,f and γ are given continuous vector-functions, g is a continuous scalar function, A, C are constant matrices, and d is a constant vector. The instants of time t where the jump occurs are determined by the equation g(t,u(t−))=0 and, thus, are unknown a priori and essentially depend on the solution u. We discuss a reduction technique allowing one to combine the analysis of existence of solutions with an efficient construction of approximate solutions. At present, according to the authors’ knowledge, no numerical results for boundary value problems with state-dependent impulses are available in the literature.
ISSN:0096-3003
1873-5649
DOI:10.1016/j.amc.2015.11.033