Add to ORKGAbstract. For a minimal circle homeomorphism f we study convergence in law of rescaled hitting time point process of an interval of length ε> 0. Although the point process in the natural time scale never converges in law, we study all possible limits under a subsequence. The new feature is the fact that, for rotation numbers of unbounded type, there is a sequence εn going to zero exhibiting coexistence of two non-trivial asymptotic limit point processes depending on the choice of time scales used when rescaling the point process. The phenomenon of loss of tightness of the first hitting time distribution is an indication of this coexistence behaviour. Moreover, tightness occurs if and only if the rotation number is of bounded type. Theref...
AbstractIn earlier work by the author, the convergence in distribution of a sequence of point proces...
Poincaré’s classification of the dynamics of homeomorphisms of the circle is one of the earliest, b...
In this dissertation, we consider two aspects of the theory of weak convergence of cadlag processes....
For a minimal circle homeomorphism f we study convergence in law of rescaled hitting time point proc...
. Given two points x; y 2 S 1 randomly chosen independently by a mixing absolutely continuous inva...
In present work we study the entrance times for circle homeomorphisms with one break point and uni...
Fix . Consider the random walk on the circle which proceeds by repeatedly rotating points forward o...
We study circle homeomorphisms f ∈ C 2 (S 1 {x b }) whose rotation number ρ f is irrational, with a ...
Let h be a piecewise-linear (PL) circle homeomorphism with two break points a0 , c0 and irrational r...
We introduce a simplifying assumption which makes it possible to approxi-mate the rotation number of...
In this paper we consider one parameter families of circle maps with nonlinear flat spot singulariti...
Letf be a “flat spot” circle map with irrational rotation number. Located at the edges of the flat s...
This paper studies how long it takes the orbit of the chaos game to reach a certain density inside t...
The smallest enclosing circle problem introduced in the nineteenth century by Sylvester asks for the...
In this article, we study a one-parameter family of circle homeomorphisms with one break point. It i...
AbstractIn earlier work by the author, the convergence in distribution of a sequence of point proces...
Poincaré’s classification of the dynamics of homeomorphisms of the circle is one of the earliest, b...
In this dissertation, we consider two aspects of the theory of weak convergence of cadlag processes....
For a minimal circle homeomorphism f we study convergence in law of rescaled hitting time point proc...
. Given two points x; y 2 S 1 randomly chosen independently by a mixing absolutely continuous inva...
In present work we study the entrance times for circle homeomorphisms with one break point and uni...
Fix . Consider the random walk on the circle which proceeds by repeatedly rotating points forward o...
We study circle homeomorphisms f ∈ C 2 (S 1 {x b }) whose rotation number ρ f is irrational, with a ...
Let h be a piecewise-linear (PL) circle homeomorphism with two break points a0 , c0 and irrational r...
We introduce a simplifying assumption which makes it possible to approxi-mate the rotation number of...
In this paper we consider one parameter families of circle maps with nonlinear flat spot singulariti...
Letf be a “flat spot” circle map with irrational rotation number. Located at the edges of the flat s...
This paper studies how long it takes the orbit of the chaos game to reach a certain density inside t...
The smallest enclosing circle problem introduced in the nineteenth century by Sylvester asks for the...
In this article, we study a one-parameter family of circle homeomorphisms with one break point. It i...
AbstractIn earlier work by the author, the convergence in distribution of a sequence of point proces...
Poincaré’s classification of the dynamics of homeomorphisms of the circle is one of the earliest, b...
In this dissertation, we consider two aspects of the theory of weak convergence of cadlag processes....