Stability of Nonlinear Autonomous Quadratic Discrete Systems in the Critical Case
作者: Josef Diblík , Denys Ya. Khusainov , Irina V. Grytsay , Zdenĕk Šmarda
DOI: 10.1155/2010/539087
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摘要: Many processes are mathematically simulated by systems of discrete equations with quadratic right-hand sides. Their stability is thought as a very important characterization the process. In this paper, method Lyapunov functions used to derive classes stable autonomous in critical case presence simple eigenvalue matrix linear terms. addition investigation, we also estimate domains.
hindawi.com参考文章(4)
Ravi P Agarwal, None, Discrete Oscillation Theory Hindawi Publishing Corporation. ,(2005) , 10.1155/9789775945198
V. E. Slyusarchuk, Theorems on instability of systems with respect to linear approximation Ukrainian Mathematical Journal. ,vol. 48, pp. 1251- 1262 ,(1996) , 10.1007/BF02383871
V. E. Slyusarchuk, ESSENTIALLY UNSTABLE SOLUTIONS OF DIFFERENCE EQUATIONS Ukrainian Mathematical Journal. ,vol. 51, pp. 1875- 1891 ,(1999) , 10.1007/BF02525131
J Diblík, D Y Khusainov, I V Grytsay, Stability investigation of nonlinear quadratic discrete dynamics systems in the critical case Journal of Physics: Conference Series. ,vol. 96, pp. 012042- ,(2008) , 10.1088/1742-6596/96/1/012042