English

$p$-adic $(2,1)$-rational dynamical systems

Dynamical Systems 2011-11-30 v1 Functional Analysis

Abstract

We investigate the trajectory of an arbitrary (2,1)(2,1)-rational pp-adic dynamical system in a complex pp-adic field \Cp\C_p. (i) In the case where there is no fixed point we show that the pp-adic dynamical system has a 2-periodic cycle x1,x2x_1, x_2. If it is attracting then it attracts each trajectory which starts from an element of a ball of radius r=x1x2pr=|x_1-x_2|_p with the center at x1x_1 or at x2x_2. If the 2-periodic cycle is an indifferent, then in each step the balls transfer to each other. All the other spheres with radius >r>r and the center at x1x_1 and x2x_2 are invariant independently of the attractiveness of the cycle. (ii) In the case where the fixed point x0x_0 is unique we prove that if the point is attracting then there exists δ>0\delta>0, such that the basin of attraction for x0x_0 is the ball of radius δ\delta and the center at x0x_0 and any sphere with radius δ\geq \delta is invariant. If x0x_0 is an indifferent point then all spheres with the center at x0x_0 are invariant. If x0x_0 is a repelling point then there exits δ>0\delta>0, such that the trajectory which starts at an element of the ball of radius δ\delta with the center in x0x_0 leaves this ball, whereas any sphere with radius δ\geq \delta is invariant. (iii) In case of existence of two fixed points, we show that Siegel disks may either coincide or be disjoint for different fixed points of the dynamical system. Besides, we find the basin of the attractor of the system. Varying the parameters it is proven that there exists an integer k2k\geq 2, and spheres Sr1(xi),...,Srk(xi)S_{r_1}(x_i), ..., S_{r_k}(x_i) such that the limiting trajectory will be periodically traveling the spheres SrjS_{r_j}. For some values of the parameters there are trajectories which go arbitrary far from the fixed points.

Keywords

Cite

@article{arxiv.1111.6725,
  title  = {$p$-adic $(2,1)$-rational dynamical systems},
  author = {S. Albeverio and U. A. Rozikov and I. A. Sattarov},
  journal= {arXiv preprint arXiv:1111.6725},
  year   = {2011}
}

Comments

21 pages

R2 v1 2026-06-21T19:43:05.234Z