INTEGRAL BVP FOR SINGULARLY PERTURBED SYSTEM OF DIFFERENTIAL EQUATIONS

K. Konisbayeva, M. Dauylbayev, N. R. Tortbay
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Abstract

The article presents a two-point integral BVP for singularly perturbed systems of linear ordinary differential equations. The integral BVP for singularly perturbed systems of ordinary differential equations previously has not been considered. The paper shows the influence of nonlocal boundary conditions on the asymptotics of the solution of the regarded BVP and the significanteffect of integral terms in the definition of the limiting BVP. An explicit constructive formula for the solution of this BVP using initial and boundary functions of the homogeneous perturbed equation is obtained. A theorem on asymptotic estimates of the solution and its derivatives is given. It is established that the solution of the integral BVP at the point is infinitely large as .From here, it follows that the solution of the considered boundary value problem has an initial jump of zero order. It is found that the solution of the original integral BVP is not close to the solution of the usual limiting unperturbed BVP. A changed limiting BVP is obtained. The presence of integrals in the boundary conditions leads to the fact that the limiting BVP is determined by the changed boundary conditions. This follows from the presence of the jump and its order. A theorem on the close between the solutions of the original perturbed and changed limiting problems is given.
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奇摄动微分方程组的积分BVP
本文给出了线性常微分方程奇摄动系统的两点积分BVP。奇摄动常微分方程组的积分BVP以前没有被考虑过。本文给出了非局部边界条件对所考虑的BVP解的渐近性的影响,以及积分项在极限BVP定义中的重要作用。利用齐次摄动方程的初始函数和边界函数,得到了求解该边值问题的显式构造公式。给出了解及其导数的渐近估计定理。证明了积分BVP在该点的解是无穷大的。由此可知,所考虑的边值问题的解具有零阶的初始跳跃。发现原始积分BVP的解并不接近于一般极限无扰动BVP的求解。得到了一个变化的极限BVP。边界条件中积分的存在导致极限BVP由改变的边界条件决定的事实。这源于跳跃的存在及其顺序。给出了原摄动极限问题解与变极限问题解的闭合性定理。
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CiteScore
0.30
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0.00%
发文量
11
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