\(p\)-adic dynamical systems of \((3,1)\)-rational functions with unique fixed point (Q2220944)

There exist several papers devoted to \(p\)-adic dynamical systems generated by \( (m, n)\)-rational functions with fixed points. In this paper such a kind of system is generated by the \((3,1)\)-rational functions with one fixed point. The authors study Siegel disks of these dynamical systems and find an upper bound for the set of limit points of each trajectory. They also examine a class of \((3,1)\)-rational functions such that for \( p \geq 3\) the dynamical systems are not ergodic, but for \(p = 2 \) they may be ergodic under some conditions.