Almost-sure quasiperiodicity in countably many co-existing circles

TL;DR

This paper provides conditions under which a countably infinite collection of circle diffeomorphisms exhibits quasiperiodic behavior on at least one circle for almost every parameter, revealing complex invariant structures in dynamical systems.

Contribution

It establishes new sufficient conditions for quasiperiodicity in countably many co-existing circles within parameterized families of dynamical systems.

Findings

Existence of quasiperiodic behavior on at least one circle for a full measure set of parameters.

Application to skew-product maps on the torus showing similar quasiperiodic properties.

Conditions under which dense trajectories and periodic points are guaranteed.

Abstract

In many dynamical systems, countably infinitely many invariant tori co-exist. The occurrence of quasiperiodicity on any one of these tori is sometimes sufficient to establish strong global properties, like dense trajectories and periodic points. In this paper, we establish sufficient conditions for a countably infinite collection of parameterized circle diffeomorphisms to have quasiperiodic behavior on at least one of the circles, for a full Lebesgue measure set of the parameter values. As an application, we study parameterized families of skew-product maps on the torus and prove sufficient conditions for the existence of at least on quasiperiodic circle for Lebesgue-almost every parameter value.