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Global behavior of nonlinear difference equations of higher order with applications

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Published by Kluwer Academic in Dordrecht, Boston .
Written in English

Subjects:

  • Nonlinear difference equations -- Numerical solutions

Book details:

Edition Notes

Includes bibliographical references (p. 205-221) and indexes.

Statementby V.L. Kocic and G. Ladas.
SeriesMathematics and its applications ;, v. 256, Mathematics and its applications (Kluwer Academic Publishers) ;, v. 256.
ContributionsLadas, G. E.
Classifications
LC ClassificationsQA431 .K66 1993
The Physical Object
Paginationxi, 228 p. ;
Number of Pages228
ID Numbers
Open LibraryOL1399881M
ISBN 10079232286X
LC Control Number93007605

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Book reviews. GLOBAL BEHAVIOR OF NONLINEAR DIFFERENCE EQUATIONS OF HIGHER ORDER WITH APPLICATIONS (Mathematics and its Applications ) Robert M. May. Search for more papers by this author. Robert M. May. Search for more papers by this author. First published: November Cited by: By V. L. Kocic and G. Ladas: pp., US$, ISBN 0 X (Kluwer, ).Cited by: Global Behavior of Nonlinear Difference Equations of Higher Order with Applications by V.L. Kocic and G. Ladas Department of Mathematics, University of Rhode Island. Some nonlinear difference equations, especially second order nonlinear difference equa- tions have been considered by many authors, see [2,3,5–7] and references cited therein. In these articles, the global attractivity, invariant interval, oscillation, permanence and some other properties of the equations were by: 8.

Global behavior of a higher order nonlinear difference equation Article in Journal of Mathematical Analysis and Applications (1) November with 24 Reads How we measure 'reads'. V.L. Kocic, G. LadasGlobal Behavior of Nonlinear Difference Equations of Higher Order with ApplicationsCited by: 6. Kocic, V.L., Ladas, G.: Global Behavior of Nonlinear Difference Equations of Higher Order with Applications. Kluwer Academic Publishers, Dordrecht () zbMATH Google Scholar by: 1. In this paper we obtain a global attractivity result for the positive equilibrium of a nonlinear second-order difference equation of the form xn+1 = f(xn, xn+1), n = 0, 1, ⃛The result applies to.

V. L. Kocic and G. Ladas, “Global Behavior of Nonlinear Difference Equations of Higher Order with Applications,” Kluwer Academic Publishers, Dordrecht, has been cited by the following article: TITLE: Periodicity and Solution of Rational Recurrence Relation of Order . Nonlinear difference equations of order greater than one are of paramount impor tance in applications where the (n + 1)st generation (or state) of the system depends on the previous k generations Read more.   The study of the nonlinear rational difference equations of a higher order is quite challenging and rewarding, and the results about these equations offer prototypes towards the development of the basic theory of the global behavior of nonlinear difference equations of a big order, recently, many researchers have investigated the behavior of Cited by: Our aim in this paper is to investigate the convergence behavior of the positive solutions of a higher order fuzzy difference equation and show that all positive solutions of this equation converge to its unique positive equilibrium under appropriate assumptions. Furthermore, we give two examples to account for the applicability of the main result of this : Guangwang Su, Taixiang Sun, Bin Qin.