摘要
利用匹配法研究了一类具有两个转向点的大参数奇摄动方程,通过Liouville-Green变换和Airy函数分别构造了方程在不同区域的外部解和内层解,得出了方程的渐近解,即解在不同范围内的5个渐近表达式及其5对常数之间的4个匹配条件.
Using the matching method,a class of singularly perturbed equations for large parameter with two turning points is discussed.The outer solutions and the interior layer solutions of the equations in different region are constructed respectively by Liouville-Green transformation and Airy function.The asymptotic solutions,i.e.five asymptotic expansions in different range,of the equations and four matching conditions among their five pairs of constants are obtained.
出处
《系统科学与数学》
CSCD
北大核心
2011年第1期41-47,共7页
Journal of Systems Science and Mathematical Sciences
基金
国家自然科学基金(11071205)资助课题
关键词
奇摄动
转向点
外部解
内层解
匹配
Singular perturbation
turning point
outer solution
interior layer solution
matching
