On the asymptotic properties of piecewise contracting maps

Abstract: We study the asymptotic dynamics of maps which are piecewise contracting on a compact space. These maps are Lipschitz continuous, with Lipschitz constant smaller than one, when restricted to any piece of a finite and dense union of disjoint open pieces. We focus on the topological and the dynamical properties of the (global) attractor of the orbits that remain in this union. As a starting point, we show that the attractor consists of a finite set of periodic points when it does not intersect the boundary of a … Show more

“…, N } the restriction f i := f | X i of the map f : X → X of Definition 7.4.4 to a piece X i has the following form: For almost all the values of the parameters a and c, the global attractor Λ is composed of a unique periodic orbit (whose period depends on the specific values of the parameters), but for the remaining set of parameters the global attractor is a Extremal Index -EI set supporting a minimal dynamics. We refer to [248] for a detailed description of the asymptotic dynamics of this map. We just quoted above the case with c = 0 and 0 the (unique) fixed point.…”

Extremes and Recurrence in Dynamical Systems

“…, N } the restriction f i := f | X i of the map f : X → X of Definition 7.4.4 to a piece X i has the following form: For almost all the values of the parameters a and c, the global attractor Λ is composed of a unique periodic orbit (whose period depends on the specific values of the parameters), but for the remaining set of parameters the global attractor is a Extremal Index -EI set supporting a minimal dynamics. We refer to [248] for a detailed description of the asymptotic dynamics of this map. We just quoted above the case with c = 0 and 0 the (unique) fixed point.…”

Extremes and Recurrence in Dynamical Systems

“…It is worth observing that the types of maps we consider here appear in the field of diophantine approximation (see [3]). Concerning the dynamics of piecewise contractions, we refer the reader to [5,6,8]. Theorem 1.1 can be reduced to Theorem 1.2, a much more general result.…”

Topological dynamics of piecewise -affine maps

“…f satisfies P5. Now, Λ is totally disconnected because f satisfies the separation property [5]. It follows that Λ is a Cantor set and f satisfies P3.…”

“…In [5], we explored the diversity of asymptotic dynamics of these systems, and proved that a rich dynamics can appear if the attractor contains discontinuity points. In particular, we exhibited threedimensional examples with exponential complexity and positive topological entropy.…”

Complexity of injective piecewise contracting interval maps