AbstractA special case of Sarkovskii's theorem says that if a continuous function has a period-3 point then it has periodic points of every order. In this note we will investigate how often orbit types of period-n guarantee a period-3 point. An informal statement of our result is that as n goes to infinity the probability that a period-n orbit guarantees a period-3 point converges to 1
Não disponívelIn the Sarkovskii\'s sequence 1 < 2 < 4 < ... < 22 .5 < 22.3 <....< 2.5 < 2.3 <.....7...
In 1964, A. N. Sharkovsky published an article in which he introduced a special ordering on the set...
AbstractBy counting the numbers of periodic points of all periods for some interval maps, we obtain ...
AbstractA special case of Sarkovskii's theorem says that if a continuous function has a period-3 poi...
The number of periodic points of a function depends on the context. The number of complex periodic p...
AbstractIn 1964, Sarkovskii defined a certain linear ordering ⩽s of the positive integers and proved...
AbstractIt is well known that the celebrated S̆arkovskii's Theorem [4] (cf. also [1]) defines a tota...
In 1964, A. N. Sharkovskii published an article in which he introduced a special ordering on the set...
In this article, we present a coherent, though not exhaustive, account of some well-known and some r...
AbstractOn the background of our earlier results concerning the coexistence of infinitely many perio...
AbstractThe so-called type problem or forcing problem is considered as a way to generalize Sharkovsk...
AbstractLet f: I → I be a continuous function on a closed interval I. If there exists x ϵ I which ha...
AbstractThis paper demonstrates that any continuous real-valued function which has an orbit with inf...
Given a function f: S → S, it is of great interest in the field of dynamical systems to figure out w...
Não disponívelIn the Sarkovskii\'s sequence 1 < 2 < 4 < ... < 22 .5 < 22.3 <....< 2.5 < 2.3 <.....7...
Não disponívelIn the Sarkovskii\'s sequence 1 < 2 < 4 < ... < 22 .5 < 22.3 <....< 2.5 < 2.3 <.....7...
In 1964, A. N. Sharkovsky published an article in which he introduced a special ordering on the set...
AbstractBy counting the numbers of periodic points of all periods for some interval maps, we obtain ...
AbstractA special case of Sarkovskii's theorem says that if a continuous function has a period-3 poi...
The number of periodic points of a function depends on the context. The number of complex periodic p...
AbstractIn 1964, Sarkovskii defined a certain linear ordering ⩽s of the positive integers and proved...
AbstractIt is well known that the celebrated S̆arkovskii's Theorem [4] (cf. also [1]) defines a tota...
In 1964, A. N. Sharkovskii published an article in which he introduced a special ordering on the set...
In this article, we present a coherent, though not exhaustive, account of some well-known and some r...
AbstractOn the background of our earlier results concerning the coexistence of infinitely many perio...
AbstractThe so-called type problem or forcing problem is considered as a way to generalize Sharkovsk...
AbstractLet f: I → I be a continuous function on a closed interval I. If there exists x ϵ I which ha...
AbstractThis paper demonstrates that any continuous real-valued function which has an orbit with inf...
Given a function f: S → S, it is of great interest in the field of dynamical systems to figure out w...
Não disponívelIn the Sarkovskii\'s sequence 1 < 2 < 4 < ... < 22 .5 < 22.3 <....< 2.5 < 2.3 <.....7...
Não disponívelIn the Sarkovskii\'s sequence 1 < 2 < 4 < ... < 22 .5 < 22.3 <....< 2.5 < 2.3 <.....7...
In 1964, A. N. Sharkovsky published an article in which he introduced a special ordering on the set...
AbstractBy counting the numbers of periodic points of all periods for some interval maps, we obtain ...
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