Asymptotic expansions about infinity for solutions of nonlinear differential equations with coherently decaying forcing functions

L. Hoang
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引用次数: 5

Abstract

This paper studies, in fine details, the long-time asymptotic behavior of decaying solutions of a general class of dissipative systems of nonlinear differential equations in complex Euclidean spaces. The forcing functions decay, as time tends to infinity, in a coherent way expressed by combinations of the exponential, power, logarithmic and iterated logarithmic functions. The decay may contain sinusoidal oscillations not only in time but also in the logarithm and iterated logarithm of time. It is proved that the decaying solutions admit corresponding asymptotic expansions, which can be constructed concretely. In the case of the real Euclidean spaces, the real-valued decaying solutions are proved to admit real-valued asymptotic expansions. Our results unite and extend the theory investigated in many previous works.
具有相干衰减强迫函数的非线性微分方程解的渐近展开式
本文详细地研究了复欧几里德空间中一类一般非线性微分方程耗散系统的衰减解的长时渐近行为。随着时间趋于无穷,强迫函数以指数、幂、对数和迭代对数函数的组合一致的方式衰减。衰减不仅在时间上,而且在时间的对数和迭代对数上可能包含正弦振荡。证明了衰减解具有相应的可具体构造的渐近展开式。在实欧几里德空间中,证明了实值衰减解允许实值渐近展开式。我们的结果统一并扩展了许多前人研究的理论。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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