Numerical implementation of solving a control problem for loaded differential equations with multi-point condition
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KU Publ.
Abstract
A linear boundary value problem with a parameter for loaded differential equations with multi-point
condition is considered. The method of parameterization is used for solving the considered problem. We
offer an algorithm for solving a control problem for the system of loaded differential equations with multipoint
condition. The linear boundary value problem with a parameter for loaded differential equations with
multi-point condition by introducing additional parameters at the partition points is reduced to equivalent
boundary value problem with parameters. The equivalent boundary value problem with parameters consists
of the Cauchy problem for the system of ordinary differential equations with parameters, multi-point
condition, and continuity conditions. The solution of the Cauchy problem for the system of ordinary
differential equations with parameters is constructed using the fundamental matrix of differential equation.
The system of linear algebraic equations concerning the parameters is composed by substituting the values
of the corresponding points in the built solutions to the multi-point condition and continuity conditions.
The numerical method for finding the solution of the problem is suggested, which based on the solving the
constructed system and solving Cauchy problem on the subintervals by Adams method and Bulirsch-Stoer
method. The proposed numerical implementation is illustrated by example.
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Kadirbayeva Zh.M. Numerical implementation of solving a control problem for loaded differential equations with multi-point condition/Zh.M. Kadirbayeva, A.D. Dzhumabaev//Қарағанды университетінің хабаршысы. Математика сериясы = Вестник Карагандинского университета. Серия Математика.= Bulletin of the Karaganda university. Mathematics Series. -2020. №4. Р.81-91.