I. A. Sattarov scite author profile

I. A. Sattarov

5Publications

28Citation Statements Received

14Citation Statements Given

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102

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Namangan State University

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p -adic dynamical systems of (2,2)-rational functions with unique fixed point

Rozikov¹,

Sattarov²

2017

Chaos, Solitons & Fractals

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Abstract. We consider a family of (2, 2)-rational functions given on the set of complex p-adic field Cp. Each such function has a unique fixed point. We study p-adic dynamical systems generated by the (2, 2)-rational functions. We show that the fixed point is indifferent and therefore the convergence of the trajectories is not the typical case for the dynamical systems. Siegel disks of these dynamical systems are found. We obtain an upper bound for the set of limit points of each trajectory, i.e., we determine a sufficiently small set containing the set of limit points. For each (2, 2)-rational function on Cp there are two pointsx1 =x1(f ),x2 =x2(f ) ∈ Cp which are zeros of its denominator. We give explicit formulas of radiuses of spheres (with the center at the fixed point) containing some points such that the trajectories (under actions of f ) of the points after a finite step come tox1 orx2. Moreover for a class of (2, 2)-rational functions we study ergodicity properties of the dynamical systems on the set of p-adic numbers Qp. For each such function we describe all possible invariant spheres. We show that the p-adic dynamical system reduced on each invariant sphere is not ergodic with respect to Haar measure.

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On a nonlinear p-adic dynamical system

Rozikov¹,

Sattarov

2014

P-Adic Num Ultrametr Anal Appl

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The Dynamical System Generated by the Floor Function

Rozikov¹,

Sattarov²,

Usmonov³

2016

JAND

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Dynamical Systems of the p-Adic (2, 2)-Rational Functions with Two Fixed Points

Rozikov¹,

Sattarov²

2020

Results Math

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p-Adic (3, 2)-rational dynamical systems

Sattarov

2015

P-Adic Num Ultrametr Anal Appl

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I. A. Sattarov

p -adic dynamical systems of (2,2)-rational functions with unique fixed point

On a nonlinear p-adic dynamical system

The Dynamical System Generated by the Floor Function

Dynamical Systems of the p-Adic (2, 2)-Rational Functions with Two Fixed Points

p-Adic (3, 2)-rational dynamical systems

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