Dynamical systems of the p-adic (2,2)-rational functions with two fixed points

Abstract

We consider a family of (2,2)-rational functions given on the set of complex p-adic field Cp. Each such function f has the two distinct fixed points x1=x1(f), x2=x2(f). We study p-adic dynamical systems generated by the (2,2)-rational functions. We prove that x1 is always indifferent fixed point for f, i.e., x1 is a center of some Siegel disk SI(x1). Depending on the parameters of the function f, the type of the fixed point x2 may be any possibility: indifferent, attractor, repeller. We find Siegel disk or basin of attraction of the fixed point x2, when x2 is indifferent or attractor, respectively. When x2 is repeller we find an open ball any point of which repelled from x2. Moreover, we study relations between the sets SI(x1) and SI(x2) when x2 is indifferent. For each (2,2)-rational function on Cp there are two points x1= 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 x1) containing some points such that the trajectories (under actions of f) of the points after a finite step come to x1 or x2. We study periodic orbits of the dynamical system and find an invariant set, which contains all periodic orbits. Moreover, we study ergodicity properties of the dynamical system on each invariant sphere. Under some conditions we show that the system is ergodic iff p=2.