AbstractThis paper demonstrates that any continuous real-valued function which has an orbit with infinitely many limit points must necessarily have periodic cycles of arbitrarily large prime period. We present an example of a function with an orbit whose limit points are exactly Z+
AbstractFor ℓ1-norm and sup-norm nonexpansive maps it is known that bounded orbits approach periodic...
AbstractRecently, Forti, Paganoni and Smítal constructed an example of a triangular map of the unite...
Given a function f: S → S, it is of great interest in the field of dynamical systems to figure out w...
The number of periodic points of a function depends on the context. The number of complex periodic p...
AbstractIt is well-known that, if a continuous map f of a closed interval into itself has a prime pe...
We prove a conjecture by Elaydi and Yakubu which states that the basin of attraction of an attractin...
We prove a conjecture by Elaydi and Yakubu which states that the basin of attraction of an attractin...
AbstractBy counting the numbers of periodic points of all periods for some interval maps, we obtain ...
AbstractIf D is a subset of Rn and f: D → D is an l1-norm nonexpansive map, then it is known that ev...
AbstractIt is well-known that, if a continuous map f of a closed interval into itself has a prime pe...
AbstractSuppose f is a map from an interval [a,b] into itself with a periodic orbit consisting of th...
AbstractA special case of Sarkovskii's theorem says that if a continuous function has a period-3 poi...
This master thesis deals with periodic points of transcendental Hénon maps, a subject in complex dyn...
AbstractIn this short note we solve in the negative the three problems recently posed by Jie-Hua Mai...
We associate via duality a dynamical system to each pair (RS,x), where RS is the ring of S-integers ...
AbstractFor ℓ1-norm and sup-norm nonexpansive maps it is known that bounded orbits approach periodic...
AbstractRecently, Forti, Paganoni and Smítal constructed an example of a triangular map of the unite...
Given a function f: S → S, it is of great interest in the field of dynamical systems to figure out w...
The number of periodic points of a function depends on the context. The number of complex periodic p...
AbstractIt is well-known that, if a continuous map f of a closed interval into itself has a prime pe...
We prove a conjecture by Elaydi and Yakubu which states that the basin of attraction of an attractin...
We prove a conjecture by Elaydi and Yakubu which states that the basin of attraction of an attractin...
AbstractBy counting the numbers of periodic points of all periods for some interval maps, we obtain ...
AbstractIf D is a subset of Rn and f: D → D is an l1-norm nonexpansive map, then it is known that ev...
AbstractIt is well-known that, if a continuous map f of a closed interval into itself has a prime pe...
AbstractSuppose f is a map from an interval [a,b] into itself with a periodic orbit consisting of th...
AbstractA special case of Sarkovskii's theorem says that if a continuous function has a period-3 poi...
This master thesis deals with periodic points of transcendental Hénon maps, a subject in complex dyn...
AbstractIn this short note we solve in the negative the three problems recently posed by Jie-Hua Mai...
We associate via duality a dynamical system to each pair (RS,x), where RS is the ring of S-integers ...
AbstractFor ℓ1-norm and sup-norm nonexpansive maps it is known that bounded orbits approach periodic...
AbstractRecently, Forti, Paganoni and Smítal constructed an example of a triangular map of the unite...
Given a function f: S → S, it is of great interest in the field of dynamical systems to figure out w...
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