Eventually Periodic Solutions for Difference Equations with Periodic Coefficients and Nonlinear Control Functions

For nonlinear difference equations of the form xn=F(n,xn−1,…,xn−m), it is usually difficult to find periodic solutions. In this paper, we consider a class of difference equations of the form xn=anxn−1+bnf(xn−k), where {an}, {bn} are periodic sequences and f is a nonlinear filtering function, and sh...

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Main Authors:	Chengmin Hou, Sui Sun Cheng
Format:	Article
Language:	English
Published:	Wiley 2008-01-01
Series:	Discrete Dynamics in Nature and Society
Online Access:	http://dx.doi.org/10.1155/2008/179589
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author	Chengmin Hou Sui Sun Cheng
author_facet	Chengmin Hou Sui Sun Cheng
author_sort	Chengmin Hou
collection	DOAJ
description	For nonlinear difference equations of the form xn=F(n,xn−1,…,xn−m), it is usually difficult to find periodic solutions. In this paper, we consider a class of difference equations of the form xn=anxn−1+bnf(xn−k), where {an}, {bn} are periodic sequences and f is a nonlinear filtering function, and show how periodic solutions can be constructed. Several examples are also included to illustrate our results.
format	Article
id	doaj-art-df36bea0b3fa401fad6e860c5b68cad1
institution	Kabale University
issn	1026-0226 1607-887X
language	English
publishDate	2008-01-01
publisher	Wiley
record_format	Article
series	Discrete Dynamics in Nature and Society
spelling	doaj-art-df36bea0b3fa401fad6e860c5b68cad12025-02-03T06:01:28ZengWileyDiscrete Dynamics in Nature and Society1026-02261607-887X2008-01-01200810.1155/2008/179589179589Eventually Periodic Solutions for Difference Equations with Periodic Coefficients and Nonlinear Control FunctionsChengmin Hou0Sui Sun Cheng1Department of Mathematics, Yanbian University, Yanji 133002, ChinaDepartment of Mathematics, Tsing Hua University, Hsinchu 30043, TaiwanFor nonlinear difference equations of the form xn=F(n,xn−1,…,xn−m), it is usually difficult to find periodic solutions. In this paper, we consider a class of difference equations of the form xn=anxn−1+bnf(xn−k), where {an}, {bn} are periodic sequences and f is a nonlinear filtering function, and show how periodic solutions can be constructed. Several examples are also included to illustrate our results.http://dx.doi.org/10.1155/2008/179589
spellingShingle	Chengmin Hou Sui Sun Cheng Eventually Periodic Solutions for Difference Equations with Periodic Coefficients and Nonlinear Control Functions Discrete Dynamics in Nature and Society
title	Eventually Periodic Solutions for Difference Equations with Periodic Coefficients and Nonlinear Control Functions
title_full	Eventually Periodic Solutions for Difference Equations with Periodic Coefficients and Nonlinear Control Functions
title_fullStr	Eventually Periodic Solutions for Difference Equations with Periodic Coefficients and Nonlinear Control Functions
title_full_unstemmed	Eventually Periodic Solutions for Difference Equations with Periodic Coefficients and Nonlinear Control Functions
title_short	Eventually Periodic Solutions for Difference Equations with Periodic Coefficients and Nonlinear Control Functions
title_sort	eventually periodic solutions for difference equations with periodic coefficients and nonlinear control functions
url	http://dx.doi.org/10.1155/2008/179589
work_keys_str_mv	AT chengminhou eventuallyperiodicsolutionsfordifferenceequationswithperiodiccoefficientsandnonlinearcontrolfunctions AT suisuncheng eventuallyperiodicsolutionsfordifferenceequationswithperiodiccoefficientsandnonlinearcontrolfunctions

Eventually Periodic Solutions for Difference Equations with Periodic Coefficients and Nonlinear Control Functions

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