We study the dynamics of a family Kαof discontinuous interval maps whose (infinitely many) branches are Möbius transformations in SL(2, Z) and which arise as the critical-line case of the family of (a, b)-continued fractions. We provide an explicit construction of the bifurcation locus EKUfor this family, showing it is parametrized by Farey words and it has Hausdorff dimension zero. As a consequence, we prove that the metric entropy of Kαis analytic outside the bifurcation set but not differentiable at points of EKUand that the entropy is monotone as a function of the parameter. Finally, we prove that the bifurcation set is combinatorially isomorphic to the main cardioid in the Mandelbrot set, providing one more entry to the dictionary deve...
198 pagesIn this thesis, we study some aspects of recurrence in three classes of dynamical systems: ...
The entropy h(Tα) of α-continued fraction transformations is known to be locally monotone outside a ...
We provide new similarities between regular continued fractions and L\"uroth series in terms of topo...
We study the dynamics of a family Kαof discontinuous interval maps whose (infinitely many) branches ...
We study the dynamics of a family Kα of discontinuous interval maps whose (infinitely many) branches...
The goal of this thesis is to provide a unified framework in which to analyze the dynamics of two se...
We consider the one-parameter family of interval maps arising from generalized continued fraction ex...
We consider the one-parameter family of interval maps arising from generalized continued fraction ex...
In this paper we construct a correspondence between the parameter spaces of two families of one-dime...
We consider a one-parameter family of expanding interval maps {T\u3b1} \u3b1 08[0,1] (Japanese conti...
We show that the entropy of the α-continued fraction map w.r.t the absolutely continuous invariant p...
In this study, we consider a special case of the family of birational maps f:C² → C² , which were dy...
This work dynamically classifies a 9-parametric family of birational maps f: C→ C. From the sequence...
International audienceTwo closely related families of ${\alpha}$-continued fractions were introduced...
In this thesis, we study some aspects of recurrence in three classes of dynamical systems: padic pol...
198 pagesIn this thesis, we study some aspects of recurrence in three classes of dynamical systems: ...
The entropy h(Tα) of α-continued fraction transformations is known to be locally monotone outside a ...
We provide new similarities between regular continued fractions and L\"uroth series in terms of topo...
We study the dynamics of a family Kαof discontinuous interval maps whose (infinitely many) branches ...
We study the dynamics of a family Kα of discontinuous interval maps whose (infinitely many) branches...
The goal of this thesis is to provide a unified framework in which to analyze the dynamics of two se...
We consider the one-parameter family of interval maps arising from generalized continued fraction ex...
We consider the one-parameter family of interval maps arising from generalized continued fraction ex...
In this paper we construct a correspondence between the parameter spaces of two families of one-dime...
We consider a one-parameter family of expanding interval maps {T\u3b1} \u3b1 08[0,1] (Japanese conti...
We show that the entropy of the α-continued fraction map w.r.t the absolutely continuous invariant p...
In this study, we consider a special case of the family of birational maps f:C² → C² , which were dy...
This work dynamically classifies a 9-parametric family of birational maps f: C→ C. From the sequence...
International audienceTwo closely related families of ${\alpha}$-continued fractions were introduced...
In this thesis, we study some aspects of recurrence in three classes of dynamical systems: padic pol...
198 pagesIn this thesis, we study some aspects of recurrence in three classes of dynamical systems: ...
The entropy h(Tα) of α-continued fraction transformations is known to be locally monotone outside a ...
We provide new similarities between regular continued fractions and L\"uroth series in terms of topo...