带参数脉冲积分微分方程边值问题的数值实现

Pub Date : 2023-09-01 DOI:10.26577/jmmcs2023v119i3a2
E. Bakirova
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引用次数: 0

摘要

研究了一类带参数Fredholm积分-微分方程组在脉冲效应下的线性边值问题。本研究的目的是提供一种数值求解所研究问题的方法。Dzhumabaev参数化方法的思想、求解柯西问题的经典数值方法和数值积分技术作为实现目标的基础。在应用脉冲效应点参数化方法时,划分了考虑边值问题的区间,引入了附加参数和新的未知函数。由此得到了一个参数与原问题等效的问题。根据方程积分项矩阵、边界条件和脉冲条件的数据,编制了关于引入参数的SLAE。并找到了未知函数作为积分-微分方程组的初特问题的解。构造了一种求带参数脉冲积分微分方程边值问题的数值算法。利用求解ODE的柯西问题和计算定积分的数值方法对所构造的算法进行了数值实现。对试验问题进行了数值计算验证。
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NUMERICAL IMPLEMENTATION FOR SOLVING THE BOUNDARY VALUE PROBLEM FOR IMPULSIVE INTEGRO-DIFFERENTIAL EQUATIONS WITH PARAMETER
In this paper, a linear boundary value problem under impulse effects for the system of Fredholm integro-differential equations with a parameter is investigated. The purpose of this research is to provide a method for solving the studied problem numerically. The ideas of the Dzhumabaev parameterisation method, classical numerical methods of solving Cauchy problems and numerical integration techniques were used as a basis for achieving the goal. When applying the method of parameterisation by points of impulse effects, the interval on which the boundary value problem is considered is divided, additional parameters and new unknown functions are introduced. As a consequence, a problem with parameters equivalent to the original problem is obtained. According to the data of the matrices of the integral term of the equation, boundary conditions and impulse conditions, the SLAE with respect to the introduced parameters is compiled. And the unknown functions are found as solutions of the initial-special problem for the system of integro-differential equations. A numerical algorithm for finding a solution to the boundary value problem for impulse integro-differential equations with a parameter is constructed. Numerical methods for solving Cauchy problems for ODE and calculating definite integrals are used for numerical implementation of the constructed algorithm. Numerical calculations are verified on test problem.
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