TITLE

Global Behavior of the Difference Equation

PUB. DATE
January 2010
SOURCE
Abstract & Applied Analysis;2010, p1
SOURCE TYPE
Academic Journal
DOC. TYPE
Article
ABSTRACT
No abstract available.
ACCESSION #
56438411

 

Related Articles

  • Reviews. Graef, John R.; Wimp, Jet // Mathematical Intelligencer;Fall99, Vol. 21 Issue 4, p60 

    Reviews the book `Global Behavior of Nonlinear Difference Equations of Higher Order With Applications,' by G. Ladas and V.L. Kocic.

  • Asymptotic Behavior of Global Solutions for Some Nonlinear Wave Equation. Yongxian YAN // Applied Mechanics & Materials;2014, Issue 630-642, p1691 

    In this paper we study the asymptotic behavior of the global solutions to the initial-boundary value problem of the nonlinear wave equation with damping term by applying a difference inequality.

  • Asymptotic Behavior of Global Solutions for Some Nonlinear Wave Equation. Yongxian YAN // Applied Mechanics & Materials;2014, Issue 638-640, p1691 

    In this paper we study the asymptotic behavior of the global solutions to the initial-boundary value problem of the nonlinear wave equation with damping term by applying a difference inequality.

  • Global Behavior of a Higher-Order Difference Equation. Tuo Li; Xiu-Mei Jia // Discrete Dynamics in Nature & Society;2010, Special section p1 

    This paper is concerned with the global behavior of higher-order difference equation of the form Due to image rights restrictions, multiple line equation(s) cannot be graphically displayed. Under some certain assumptions, it is proved that the positive equilibrium is globally asymptotical stable.

  • Dynamics for Nonlinear Difference Equation xn+1 = (αxn-k)/(β + γxpn-1). Dongmei Chen; Xianyi Li; Yanqin Wang // Advances in Difference Equations;2009, Special section p1 

    We mainly study the global behavior of the nonlinear difference equation in the title, that is, the global asymptotical stability of zero equilibrium, the existence of unbounded solutions, the existence of period two solutions, the existence of oscillatory solutions, the existence, and...

  • On the Difference Equation xn+1 = α + xn-m/xnk. Yalçnkaya, Ibrahim // Discrete Dynamics in Nature & Society;2008, p1 

    The article presents information on a study which investigated the global behavior of the difference equation of higher order. It notes that although difference equations are relatively simple in form, it is, unfortunately, extremely difficult to understand thoroughly the global behavior of...

  • Permanence and asymptotic properties of nonlinear delay difference equations. Wan-tong, Li // Applied Mathematics & Mechanics;Nov2003, Vol. 24 Issue 11, p1273 

    The asymptotic behavior of a class of nonlinear delay difference equation was studied. Some sufficient conditions are obtained for permanence and global attractivity. The results can be applied to a class of nonlinear delay difference equations and to the delay discrete Logistic model and some...

  • Global and Local. Franklin, James // Mathematical Intelligencer;Dec2014, Vol. 36 Issue 4, p4 

    The article offers information on the prevalent examples of local and global mathematical distinctions and techniques. It mentions the difference between the global and local behaviors of mathematical functions and differential equations. Moreover, it cites the global/local contrast of Gottfried...

  • On the Global Asymptotic Stability of a Second-Order System of Difference Equations. Yalcinkaya, Ibrahim // Discrete Dynamics in Nature & Society;2008, p1 

    The article presents information on a study which investigated the global asymptotic stability of a second-order system of difference equations. It is inferred that difference equations appear naturally as discrete analogues and as numerical solutions of differential and delay differential...

  • On a Discrete Epidemic Model. Stević, Stevo // Discrete Dynamics in Nature & Society;2007, p1 

    The article investigates the oscillatory behavior, the global stability and periodic character of the solutions of a difference equation. It is stated that the interest in studying nonlinear and rational equations has been increased by the necessity for some techniques which can be used in...

Share

Read the Article

Courtesy of VIRGINIA BEACH PUBLIC LIBRARY AND SYSTEM

Sorry, but this item is not currently available from your library.

Try another library?
Sign out of this library

Other Topics