Separable quadratic stochastic operators

被引：7

作者：

Rozikov U.A. ^{[1
]}

Nazir S. ^{[2
]}

机构：

[1] Institute of Mathematics and Information Technologies, Tashkent

[2] The Abdus Salam International Center for Theoretical Physics Trieste, Trieste

来源：

Lobachevskii Journal of Mathematics | 2010年 / 31卷 / 3期

关键词：

ω-limit trajectory; Lyapunov function; Quadratic stochastic operator;

D O I：

10.1134/S1995080210030030

中图分类号：

学科分类号：

摘要：

We consider quadratic stochastic operators, which are separable as a product of two linear operators. Depending on properties of these linear operators we classify the set of the separable quadratic stochastic operators: first class of constant operators, second class of linear and third class of nonlinear (separable) quadratic stochastic operators. Since the properties of operators from the first and second classes are well-known, we mainly study properties of the operators of the third class. We describe some Lyapunov functions of the operators and apply them to study ω-limit sets of the trajectories generated by the operators. Also we compare our results with known results of the theory of quadratic operators and give some open problems. © 2010 Pleiades Publishing, Ltd.

引用

页码：215 / 221

页数：6

共 11 条

[1] Bernstein S.N., The solution of a mathematical problem related to the theory of heredity, Uchen. Zapiski Nauchno-Issled. Kafedry Ukr. Otd. Matem., 1, (1924)
[2] Ganikhodjaev N.N., Rozikov U.A., On quadratic stochastic operators generated by Gibbs distributions, Regul. Chaotic Dyn., 11, 4, (2006)
[3] Ganikhodjaev N.N., On the application of the theory of Gibbs distributions in mathematical genetics, Russian Acad. Sci. Dokl. Math., 61, 3, (2000)
[4] Ganikhodzhaev R.N., Quadratic stochastic operators, Lyapunov functions, and tournaments, Russian Acad. Sci. Sb. Math., 76, 2, (1993)
[5] Ganikhodzhaev R.N., On the definition of quadratic bistochastic operators, Russian Math. Surveys, 48, 4, (1993)
[6] Ganikhodzhaev R.N., Eshmamatova D.B., Quadratic automorphisms of a simplex and the asymptotic behaviour of their trajectories, Vladikavkaz.Math. Zh., 8, 2, (2006)
[7] Ganikhodzhaev R.N., Map of fixed points and Lyapunov functions for a class of discrete dynamical systems, Math. Notes., 56, 5, (1994)
[8] Pang L.-P., Spedicato E., Xia Z.-Q., Wang W., A method for solving the system of linear equations and linear inequalities, Math. Comp. Model., 46, (2007)
[9] Rozikov U.A., Zhamilov U.U., On F-quadratic stochastic operators, Math. Notes., 83, 4, (2008)
[10] Rozikov U.A., Zada A., On F-Volterra quadratic stochastic operators, Doklady Math., 79, 1, (2009)

← 1 2 →