Asymptotic solutions of singularly perturbed linear differential-algebraic equations with periodic coefficients

Q3 Mathematics
S. Radchenko, V. Samoilenko, P. Samusenko
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引用次数: 0

Abstract

The paper deals with the problem of constructing asymptotic solutions for singular perturbed linear differential-algebraic equations with periodic coefficients. The case of multiple roots of a characteristic equation is studied. It is assumed that the limit pencil of matrices of the system has one eigenvalue of multiplicity n, which  corresponds to two finite elementary divisors and two infinite elementary divisors whose multiplicity is greater than 1.A technique for finding the asymptotic solutions is developed and n formal linearly independent solutions are constructed for the corresponding differential-algebraic system. The developed algorithm for constructing formal solutions of the system is a nontrivial generalization of the corresponding algorithm for constructing asymptotic solutions of a singularly perturbed system of differential equations in normal form, which was used in the case of simple roots of the characteristic equation.The modification of the algorithm is based on the equalization method in a special way the coefficients at powers of a small parameter in algebraic systems of equations, from which the coefficients of the formal expansions of the searched solution are found. Asymptotic estimates for the terms of these expansions with respect to a small parameter are also given.For an inhomogeneous differential-algebraic system of equations with periodic coefficients, existence and uniqueness theorems for a periodic solution satisfying some asymptotic estimate are proved, and an algorithm for constructing the corresponding formal solutions of the system is developed. Both critical and non-critical cases are considered.
具有周期系数的奇摄动线性微分代数方程的渐近解
研究了具有周期系数的奇异摄动线性微分代数方程的渐近解的构造问题。研究了特征方程的多根情况。假设系统的矩阵的极限笔具有一个重数为n的特征值,它对应于两个有限初等因子和两个无穷大初等因子,它们的重数大于1。发展了一种求渐近解的技术,并为相应的微分代数系统构造了n个形式的线性无关解。所开发的构造系统形式解的算法是构造正态奇异摄动微分方程组渐近解的相应算法的非平凡推广,该算法用于特征方程的简单根的情况。该算法的修改是基于均衡方法,以一种特殊的方式——代数方程组中小参数的幂系数,从中可以找到搜索解的形式展开的系数。还给出了这些展开项相对于小参数的渐近估计。对于具有周期系数的非齐次微分代数方程组,证明了满足某些渐近估计的周期解的存在唯一性定理,并给出了构造该系统相应形式解的算法。同时考虑危急和非危急情况。
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来源期刊
Matematychni Studii
Matematychni Studii Mathematics-Mathematics (all)
CiteScore
1.00
自引率
0.00%
发文量
38
期刊介绍: Journal is devoted to research in all fields of mathematics.
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