English

On a non-linear $p$-adic dynamical system

Dynamical Systems 2013-10-21 v1

Abstract

We investigate the behavior of trajectories of a (3,2)(3,2)-rational pp-adic dynamical system in the complex pp-adic filed Cp{\mathbb C}_p, when there exists a unique fixed point x0x_0. We study this pp-adic dynamical system by dynamics of real radiuses of balls (with the center at the fixed point x0x_0). We show that there exists a radius rr depending on parameters of the rational function such that: when x0x_0 is an attracting point then the trajectory of an inner point from the ball Ur(x0)U_r(x_0) goes to x0x_0 and each sphere with a radius >r>r (with the center at x0x_0) is invariant; When x0x_0 is a repeller point then the trajectory of an inner point from a ball Ur(x0)U_r(x_0) goes forward to the sphere Sr(x0)S_r(x_0). Once the trajectory reaches the sphere, in the next step it either goes back to the interior of Ur(x0)U_r(x_0) or stays in Sr(x0)S_r(x_0) for some time and then goes back to the interior of the ball. As soon as the trajectory goes outside of Ur(x0)U_r(x_0) it will stay (for all the rest of time) in the sphere (outside of Ur(x0)U_r(x_0)) that it reached first.

Keywords

Cite

@article{arxiv.1310.4942,
  title  = {On a non-linear $p$-adic dynamical system},
  author = {U. A. Rozikov and I. A. Sattarov},
  journal= {arXiv preprint arXiv:1310.4942},
  year   = {2013}
}

Comments

12 pages

R2 v1 2026-06-22T01:49:27.780Z