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Öğe Global asymptotic stability of a system of difference equations(TAYLOR & FRANCIS LTD, 2008) Yalcinkaya, Ibrahim; Cinar, Cengiz; Simsek, DagistanIn this article, a sufficient condition is obtained for the global asymptotic stability of the following system of difference equations Z(n+1) = Z(n)t(n-1) + a/Z(n) + t(n-1), t(n+1) = t(n)Z(n-1) + a/t(n) + Z(n-1), n=0,1,2,... where the parameter a is an element of (0, infinity) and the initial values (z(k), t(k)) is an element of(0, infinity) (for k = -1, 0).Öğe On the behavior of positive solutions of the system of rational difference equations xn+1 = xn-1/ynxn-1+1, yn+1 = yn-1/xnyn-1+1(PERGAMON-ELSEVIER SCIENCE LTD, 2011) Kurbanli, Abdullah Selcuk; Cinar, Cengiz; Yalcinkaya, IbrahimIn this paper, we investigate the positive solutions of the system of difference equations x(n+1) = xn-1/YnXn-1+1, Yn+1 = Yn-1/XnYn-1+1 , where y(0), y(-1), x(0), x(-1) is an element of [0,+infinity). (C) 2010 Elsevier Ltd. All rights reserved.Öğe On the Difference Equation xn+1 = alpha + xn-m/x(n)(k)(HINDAWI PUBLISHING CORPORATION, 2008) Yalcinkaya, IbrahimWe investigate the global behaviour of the difference equation of higher order x(n+1) = alpha + x(n-m)/x(n)(k), n = 0, 1, ..., where the parameters alpha, k is an element of (0,infinity) and the initial values x(-m), x(-(m-1)), ..., x(-2), x(-1), and x(0) are arbitrary positive real numbers. Copyright (c) 2008. Ibrahim Yalcinkaya.Öğe On the dynamics of the recursive sequence x(n+1) = alpha xn-1/beta+gamma Sigma k=1t xn-2k Pi k=1t xn-2k(PERGAMON-ELSEVIER SCIENCE LTD, 2011) Erdogan, M. Emre; Cinar, Cengiz; Yalcinkaya, IbrahimIn this paper, we investigate the global behavior of the difference equation x(n+1) = alpha x(n-1)/beta+gamma Sigma(t)(k=1) x(n-2k) Pi(t)(k=1) x(n-2k) , n = 0, 1, ... where beta is a positive parameter and a,. are non-negative parameters, with non-negative initial conditions. (C) 2011 Elsevier Ltd. All rights reserved.Öğe On the dynamics of the recursive sequence xn+1 = xn-1/beta+gamma xn-2(2)xn-4+gamma xn-2xn-4(2)(PERGAMON-ELSEVIER SCIENCE LTD, 2011) Erdogan, M. Emre; Cinar, Cengiz; Yalcinkaya, IbrahimIn this paper, we investigate the global behavior of the difference equation x(n+1) = x(n-1)/beta+gamma x(n-2)(2)x(n-4)+gamma x(n-2)x(n-4)(2), n = 0, 1, ... with positive parameters and non-negative initial conditions. (C) 2010 Elsevier Ltd. All rights reserved.Öğe On the Global Asymptotic Stability of a Second-Order System of Difference Equations(HINDAWI PUBLISHING CORPORATION, 2008) Yalcinkaya, IbrahimA sufficient condition is obtained for the global asymptotic stability of the following system of difference equations z(n+1) = (t(n)z(n-1) + a)/(t(n) + z(n-1)), t(n+1) = (z(n)t(n-1) + a)/(z(n) + t(n-1)), n = 0, 1, 2,..., where the parameter a epsilon(0,infinity) and the initial values (z(k), t(k))epsilon(0, infinity) (for k = -1, 0). Copyright (C) 2008 Ibrahim Yalcinkaya.Öğe On the periodicity of a difference equation with maximum(HINDAWI LTD, 2008) Gelisken, Ali; Cinar, Cengiz; Yalcinkaya, IbrahimWe investigate the periodic nature of solutions of the max difference equation x(n+1) = max{x(n), A}/(x(n)x(n-1)), n = 0, 1,..., where A is a positive real parameter, and the initial conditions x(-1) = A(r-1) and x(0) = A(r0) such that r(-1) and r(0) are positive rational numbers. The results in this paper answer the Open Problem 6.2 posed by Grove and Ladas (2005). Copyright (c) 2008 Ali Gelisken et al.Öğe On the recursive sequence x(n+1) = xn-(5k+9)/1+xn-4xn-9 ... xn-(5k+4)(MATHEMATICAL SOC REP CHINA, 2008) Simsek, Dagistan; Cinar, Cengiz; Yalcinkaya, IbrahimIn this paper a solution of the following difference equation was investigated x(n+1) = x(n-(5k+9))/1+x(n-4)x(n-9) ... x(n-(5k+4)), n =0, 1, 2, ... where x(-(5k+9)), x(-(5k+8)), ..., x(-1), x(0) is an element of (0, infinity).Öğe On the solutions of systems of difference equations(HINDAWI PUBLISHING CORPORATION, 2008) Yalcinkaya, Ibrahim; Cinar, Cengiz; Atalay, MuhammetWe show that every solution of the following system of di. erence equations x(n+1)((1)) = x(n)((2))/(x(n)((2))-1), x(n+1)((2)) = x(n)((3))/(x(n)((3))-1), ..., x(n+1)((k)) = x(n)((1))/(x(n)((1)) - 1) as well as of the system x(n+1)((1))= x(n)((k))/(x(n)((k)) -1), x(n+1)((2)) =x(n)((1))/(x(n)((1))-1), ..., x(n+1)((k))/(x(n)((k-1))-1) is periodic with period 2k if k not equal 0 (mod2), and with period k if k=0 (mod) where the initial values are nonzero real numbers for x(0)((1)), x(0)((2)), ..., x(0)((k)) not equal 1. Copyright (c) 2008. Ibrahim Yalcinkaya 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.
