Umrbek Olimov

    Publications:

    Olimov U. R., Rozikov U. A.
    Abstract
    We investigate discrete-time dynamical systems generated by an infinite-dimensional nonlinear operator that maps the Banach space $l_1^{}$ to itself. It is demonstrated that this operator possesses up to seven fixed points. By leveraging the specific form of our operator, we illustrate that analyzing the operator can be simplified to a two-dimensional approach. Subsequently, we provide a detailed description of all fixed points, invariant sets for the two-dimensional operator and determine the set of limit points for its trajectories. These results are then applied to find the set of limit points for trajectories generated by the infinite-dimensional operator.
    Keywords: infinite-dimensional operator, trajectory, fixed point, limit point, partial order
    Citation: Olimov U. R., Rozikov U. A.,  Dynamical Systems of an Infinite-Dimensional Nonlinear Operator on the Banach Space $l_1$, Rus. J. Nonlin. Dyn., 2024, Vol. 20, no. 4, pp.  685-703
    DOI:10.20537/nd240804

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