In this work we accomplish several goals. First, we show how a geometric game introduced by Schmidt can be used to estimate various notions of the size of some interesting sets in dynamical systems. Specifically, we analyze so-called exceptional sets (sets of points whose orbit closures miss a prescribed point) arising from a class of nonuniformly expanding circle maps and show that, under reasonable conditions, such sets are winning for Schmidt's game. This implies that these sets are quite large in a certain sense, having full Hausdorff dimension despite being Lebesgue-null. Second, we show how a dynamical variation of Schmidt's game introduced by Weisheng Wu may be employed to measure other Caratheodory dimension characteristics besid...
First introduced by Wolfgang Schmidt, the (α, β)-game and its modifications have been shown to be a ...
International audienceWe continue our study of the dynamics of mappings with small topological degre...
One of the objects of geometric measure theory is to derive global geometric structures from local p...
Let f : M -> M be a C1+theta-partially hyperbolic diffeomorphism. We introduce a type of modified...
We prove, for subshifts of finite type, conformal repellers, and two-dimensional horseshoes, that th...
For subshifts of finite type, conformal repellers, and conformal horseshoes, we prove that the set o...
Schmidt's game is a powerful tool for studying properties of certain sets which arise in Diophantine...
This is the author accepted manuscript. The final version is available from IOP Publishing via the D...
ABSTRACT. We show that for a $C^{1} $ one-dimensional map there is a hyperbolic Cantorset in aneighb...
We study here a method for estimating the topological entropy of a smooth dynamical system. Our meth...
This thesis consists of an introductory chapter followed by five papers. In the first paper, expandi...
Abstract. Let (X, d, T) be a dynamical system, where (X, d) is a compact metric space and T: X → X a...
Numerical investigations conducted over a wealth of nonlinear area-preserving smooth maps (e.g. the ...
We investigate the relationship between Poincare recurrence and topological entropy of a dynamical s...
Abstract. Given b> 1 and y ∈ R/Z, we consider the set of x ∈ R such that y is not a limit point o...
First introduced by Wolfgang Schmidt, the (α, β)-game and its modifications have been shown to be a ...
International audienceWe continue our study of the dynamics of mappings with small topological degre...
One of the objects of geometric measure theory is to derive global geometric structures from local p...
Let f : M -> M be a C1+theta-partially hyperbolic diffeomorphism. We introduce a type of modified...
We prove, for subshifts of finite type, conformal repellers, and two-dimensional horseshoes, that th...
For subshifts of finite type, conformal repellers, and conformal horseshoes, we prove that the set o...
Schmidt's game is a powerful tool for studying properties of certain sets which arise in Diophantine...
This is the author accepted manuscript. The final version is available from IOP Publishing via the D...
ABSTRACT. We show that for a $C^{1} $ one-dimensional map there is a hyperbolic Cantorset in aneighb...
We study here a method for estimating the topological entropy of a smooth dynamical system. Our meth...
This thesis consists of an introductory chapter followed by five papers. In the first paper, expandi...
Abstract. Let (X, d, T) be a dynamical system, where (X, d) is a compact metric space and T: X → X a...
Numerical investigations conducted over a wealth of nonlinear area-preserving smooth maps (e.g. the ...
We investigate the relationship between Poincare recurrence and topological entropy of a dynamical s...
Abstract. Given b> 1 and y ∈ R/Z, we consider the set of x ∈ R such that y is not a limit point o...
First introduced by Wolfgang Schmidt, the (α, β)-game and its modifications have been shown to be a ...
International audienceWe continue our study of the dynamics of mappings with small topological degre...
One of the objects of geometric measure theory is to derive global geometric structures from local p...