Add to ORKGIn this thesis, we show a method to dynamically generate expansions of numbers in an arbitrary base β > 1 using maps called the lazy and greedy maps. We introduce concepts such as the Frobenius-Perron operator, which we then use to find the unique absolutely continuous invariant measure for the greedy map in the case where the base is equal to the golden mean. We provide some intuition about most concepts and results as they are introduced. We introduce a two-dimensional random map K which simultaneously generates two random β-expansions and show that it can be essentially identified with the left shift. We then find an invariant measure of maximal entropy for K. We introduce a skew product transformation based on K and prove that there exi...
We continue the study of random continued fraction expansions, generated by random application of th...
Abstract. We consider small random perturbations of expanding and piecewise expand-ing maps and prov...
A random map is a discrete-time dynamical system in which one of a number of transformations is rand...
Abstract. Let β> 1 be a non-integer. We consider expansions of the form � ∞ i=1 d i β i, where th...
The N-continued fraction expansion is a generalization of the regular continued fraction expansion, ...
A 2-continued fraction expansion is a generalisation of the regular continued fraction expansion, wh...
We work on the expansions of real numbers in non integer bases. We recall the construction of the na...
Let beta be a real number bigger than 1 and A a finite set of arbitrary real numbers. A beta-expansi...
Keywords. Greedy expansions, lazy expansions, absolutely continuous invariant measures, measures of...
In this paper we study the ergodic properties of non-greedy series expansions to non-integer bases ...
In this work, referring to some major results achieved in Ergodic Theory, we discuss a theoretical a...
We construct a geometrico-symbolic version of the natural extension of the random β-transformation i...
Abstract. We introduce a family of dynamical systems that generate negative β-expansions and study t...
A randommap is a discrete-time dynamical system in which one of a number of transfor-mations is rand...
We introduce a family of maps {Sη}η∈[1,2] defined on [−1,1] by Sη(x)=2x−dη, where d∈{−1,0,1}. Each m...
We continue the study of random continued fraction expansions, generated by random application of th...
Abstract. We consider small random perturbations of expanding and piecewise expand-ing maps and prov...
A random map is a discrete-time dynamical system in which one of a number of transformations is rand...
Abstract. Let β> 1 be a non-integer. We consider expansions of the form � ∞ i=1 d i β i, where th...
The N-continued fraction expansion is a generalization of the regular continued fraction expansion, ...
A 2-continued fraction expansion is a generalisation of the regular continued fraction expansion, wh...
We work on the expansions of real numbers in non integer bases. We recall the construction of the na...
Let beta be a real number bigger than 1 and A a finite set of arbitrary real numbers. A beta-expansi...
Keywords. Greedy expansions, lazy expansions, absolutely continuous invariant measures, measures of...
In this paper we study the ergodic properties of non-greedy series expansions to non-integer bases ...
In this work, referring to some major results achieved in Ergodic Theory, we discuss a theoretical a...
We construct a geometrico-symbolic version of the natural extension of the random β-transformation i...
Abstract. We introduce a family of dynamical systems that generate negative β-expansions and study t...
A randommap is a discrete-time dynamical system in which one of a number of transfor-mations is rand...
We introduce a family of maps {Sη}η∈[1,2] defined on [−1,1] by Sη(x)=2x−dη, where d∈{−1,0,1}. Each m...
We continue the study of random continued fraction expansions, generated by random application of th...
Abstract. We consider small random perturbations of expanding and piecewise expand-ing maps and prov...
A random map is a discrete-time dynamical system in which one of a number of transformations is rand...