On a problem for a delay differential equation

Iskakova, N.B.; Temesheva, S. M.; Uteshova, Roza

doi:10.1002/mma.9181

Math Methods in App Sciences

2023

DOI: 10.1002/mma.9181

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On a problem for a delay differential equation

N.B. Iskakova

S. M. Temesheva

Roza Uteshova

Abstract: The article considers a nonlinear boundary value problem for a linear delay differential equation. To solve the problem, the idea of parametrization method, namely, the interval at which the problem is being considered, is divided into subintervals whose lengths do not exceed the values of the constant delay; constant parameters are introduced at the left ends of these intervals; a new unknown function is introduced at each subinterval. Thus, the problem under consideration is reduced to an equivalent multipoi… Show more

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2024

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Cited by 3 publications

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Solving multi-point problem for Volterra-Fredholm integro-differential equations using Dzhumabaev parameterization method

Bakirova,

Assanova,

Kadirbayeva

2024

Open Mathematics

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In this study, a multipoint boundary value problem for Volterra-Fredholm integro-differential equations is considered. The addition of a new function converts the system of Volterra-Fredholm integro-differential equations to a system of Fredholm integro-differential equations. In contrast to the original problem, the dimension of a Fredholm integro-differential equation is determined by the number of matrices in the degenerate kernel of the Volterra integral. A numerical algorithm of Dzhumabaev parameterization method for addressing a multipoint boundary value problem for Volterra-Fredholm integro-differential equations is proposed. The main advantage of the proposed method is splitting the problem into auxiliary Cauchy problems for ordinary differential equations and a system of algebraic equations with respect to the parameters. The conditions for the unique solvability of the multipoint boundary value problem for Fredholm integro-differential equations are established. Finally, various numerical examples are provided to demonstrate the efficiency and correctness of the suggested technique.

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Solving multi-point problem for Volterra-Fredholm integro-differential equations using Dzhumabaev parameterization method

Bakirova,

Assanova,

Kadirbayeva

2024

Open Mathematics

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Solving Fredholm integro-differential equations involving integral condition: A new numerical method

Kadirbayeva,

Bakirova,

Tleulessova

2024

Mathematica Slovaca

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Numerical Method for Solving the Boundary Value Problem for the Parabolic Equation

Iskakova,

Kadirbayeva,

Bakirova

et al. 2024

jour

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A linear boundary value problem for a parabolic equation is considered in a closed domain. Based on the broken line method, the boundary value problem for a parabolic equation is replaced by a two-point boundary value problem for a system of linear ordinary differential equations by discretizing the unknown function u(t,x) with respect to the variable x. The obtained two-point boundary value problem is investigated by the parameterization method of Professor Dzhumabaev. Based on this method, an algorithm for finding a numerical solution to the two-point boundary value problem for a system of linear ordinary differential equations is constructed. The constructed algorithm is realized by applying known numerical methods. The constructiveness and efficiency of the parameterization method also allows us to construct a numerical solution of the considered linear boundary value problem for the parabolic equation. One numerical example is given to verify and illustrate the proposed algorithm.

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On a problem for a delay differential equation

Cited by 3 publications

References 28 publications

Solving multi-point problem for Volterra-Fredholm integro-differential equations using Dzhumabaev parameterization method

Solving multi-point problem for Volterra-Fredholm integro-differential equations using Dzhumabaev parameterization method

Solving Fredholm integro-differential equations involving integral condition: A new numerical method

Numerical Method for Solving the Boundary Value Problem for the Parabolic Equation

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