Linearization of impulsive differential equations with ordinary dichotomy

This paper presents a linearization theorem for the impulsive differential equations when the linear system has ordinary dichotomy. We prove that when the linear impulsive system has ordinary dichotomy, the nonlinear system x ̇(t)=A(t)x(t)+f(t,x), t≠t_k, ∆x(t_k )= A ̃(t_k )x(t_k )+ f ̃(t_k,x), k∈Z i...

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Main Authors:	Wong, P. J. Y., Gao, Yongfei, Yuan, Xiaoqing, Xia, Yonghui
其他作者:	School of Electrical and Electronic Engineering
格式:	Article
語言:	English
出版:	2014
主題:	DRNTU::Engineering::Electrical and electronic engineering
在線閱讀:	https://hdl.handle.net/10356/104846 http://hdl.handle.net/10220/20366
標簽:	添加標簽沒有標簽, 成為第一個標記此記錄!
機構:	Nanyang Technological University
語言:	English

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record_format	dspace
spelling	sg-ntu-dr.10356-1048462020-03-07T14:00:36Z Linearization of impulsive differential equations with ordinary dichotomy Wong, P. J. Y. Gao, Yongfei Yuan, Xiaoqing Xia, Yonghui School of Electrical and Electronic Engineering DRNTU::Engineering::Electrical and electronic engineering This paper presents a linearization theorem for the impulsive differential equations when the linear system has ordinary dichotomy. We prove that when the linear impulsive system has ordinary dichotomy, the nonlinear system x ̇(t)=A(t)x(t)+f(t,x), t≠t_k, ∆x(t_k )= A ̃(t_k )x(t_k )+ f ̃(t_k,x), k∈Z is topologically conjugated to x ̇(t)=A(t)x(t), t≠t_k, ∆x(t_k )= A ̃(t_k )x(t_k ), k∈Z, where ∆x(t_k )=x(t_k^+ )-x(t_k^-), x(t_k^- )= x(t_k), represents the jump of the solution x(t) at t= t_k. Finally, two examples are given to show the feasibility of our results. Published version 2014-08-21T06:15:39Z 2019-12-06T21:41:05Z 2014-08-21T06:15:39Z 2019-12-06T21:41:05Z 2014 2014 Journal Article Gao, Y., Yuan, X., Xia, Y., & Wong, P. J. Y. (2014). Linearization of Impulsive Differential Equations with Ordinary Dichotomy. Abstract and Applied Analysis, 2014, 632109-. 1085-3375 https://hdl.handle.net/10356/104846 http://hdl.handle.net/10220/20366 10.1155/2014/632109 en Abstract and applied analysis Copyright © 2014 Yongfei Gao et al. This is an open access article distributed under the Creative Commons Attribution License, which permits unrestricted use, distribution, and reproduction in any medium, provided the original work is properly cited. application/pdf
institution	Nanyang Technological University
building	NTU Library
country	Singapore
collection	DR-NTU
language	English
topic	DRNTU::Engineering::Electrical and electronic engineering
spellingShingle	DRNTU::Engineering::Electrical and electronic engineering Wong, P. J. Y. Gao, Yongfei Yuan, Xiaoqing Xia, Yonghui Linearization of impulsive differential equations with ordinary dichotomy
description	This paper presents a linearization theorem for the impulsive differential equations when the linear system has ordinary dichotomy. We prove that when the linear impulsive system has ordinary dichotomy, the nonlinear system x ̇(t)=A(t)x(t)+f(t,x), t≠t_k, ∆x(t_k )= A ̃(t_k )x(t_k )+ f ̃(t_k,x), k∈Z is topologically conjugated to x ̇(t)=A(t)x(t), t≠t_k, ∆x(t_k )= A ̃(t_k )x(t_k ), k∈Z, where ∆x(t_k )=x(t_k^+ )-x(t_k^-), x(t_k^- )= x(t_k), represents the jump of the solution x(t) at t= t_k. Finally, two examples are given to show the feasibility of our results.
author2	School of Electrical and Electronic Engineering
author_facet	School of Electrical and Electronic Engineering Wong, P. J. Y. Gao, Yongfei Yuan, Xiaoqing Xia, Yonghui
format	Article
author	Wong, P. J. Y. Gao, Yongfei Yuan, Xiaoqing Xia, Yonghui
author_sort	Wong, P. J. Y.
title	Linearization of impulsive differential equations with ordinary dichotomy
title_short	Linearization of impulsive differential equations with ordinary dichotomy
title_full	Linearization of impulsive differential equations with ordinary dichotomy
title_fullStr	Linearization of impulsive differential equations with ordinary dichotomy
title_full_unstemmed	Linearization of impulsive differential equations with ordinary dichotomy
title_sort	linearization of impulsive differential equations with ordinary dichotomy
publishDate	2014
url	https://hdl.handle.net/10356/104846 http://hdl.handle.net/10220/20366
_version_	1681035527726301184

Linearization of impulsive differential equations with ordinary dichotomy

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