Abstract. Given b> 1 and y ∈ R/Z, we consider the set of x ∈ R such that y is not a limit point of the sequence {bnx mod 1: n ∈ N}. Such sets are known to have full Hausdorff dimension, and in many cases have been shown to have a stronger property of being winning in the sense of Schmidt. In this paper, by utilizing Schmidt games, we prove that these sets and their bi-Lipschitz images must intersect with ‘sufficiently regular ’ fractals K ⊂ R (that is, supporting measures µ satisfying certain decay conditions). Furthermore, the intersection has full dimension in K if µ satisfies a power law (this holds for example if K is the middle third Cantor set). Thus it follows that the set of numbers in the middle third Cantor set which are normal...
AbstractFor any real number θ, the set of all real numbers x for which there exists a constant c(x)>...
J. An (2013) proved that for any $s,t \geq 0$ such that $s + t = 1$, $\mathbf{Bad}(s,t)$ is $(34\sqr...
Thesis (Ph. D.)--University of Rochester. Department of Mathematics, 2020.We prove that fractal sets...
AbstractWe prove that for every M,N∈N, if τ is a Borel, finite, absolutely friendly measure supporte...
In this work we accomplish several goals. First, we show how a geometric game introduced by Schmidt...
Hausdorff and box dimension are two familiar notions of fractal dimension. Box dimension can be larg...
Sets of divergence points, i.e. numbers x (or tuples of numbers) for which the limiting frequency of...
Abstract. We determine the constructive dimension of points in random translates of the Cantor set. ...
Schmidt's game is a powerful tool for studying properties of certain sets which arise in Diophantine...
In the thesis we pursue the term Hausdorff measure and dimension. Hausdorff measure is a non-negativ...
AbstractFor n ∈ N, the sets En consist of all α ∈ (0, 1) whose continued fraction expansion involves...
AbstractThe set L of essentially non-normal numbers of the unit interval (i.e., the set of real numb...
We examine the dimensions of the intersection of a subset E of an m-ary Cantor space Cm with the ima...
Abstract. We study the extent to which the Hausdorff dimension of a com-pact subset of an infinite-d...
Abstract. We introduce a new concept of dimension for metric spaces, the so called topological Hausd...
AbstractFor any real number θ, the set of all real numbers x for which there exists a constant c(x)>...
J. An (2013) proved that for any $s,t \geq 0$ such that $s + t = 1$, $\mathbf{Bad}(s,t)$ is $(34\sqr...
Thesis (Ph. D.)--University of Rochester. Department of Mathematics, 2020.We prove that fractal sets...
AbstractWe prove that for every M,N∈N, if τ is a Borel, finite, absolutely friendly measure supporte...
In this work we accomplish several goals. First, we show how a geometric game introduced by Schmidt...
Hausdorff and box dimension are two familiar notions of fractal dimension. Box dimension can be larg...
Sets of divergence points, i.e. numbers x (or tuples of numbers) for which the limiting frequency of...
Abstract. We determine the constructive dimension of points in random translates of the Cantor set. ...
Schmidt's game is a powerful tool for studying properties of certain sets which arise in Diophantine...
In the thesis we pursue the term Hausdorff measure and dimension. Hausdorff measure is a non-negativ...
AbstractFor n ∈ N, the sets En consist of all α ∈ (0, 1) whose continued fraction expansion involves...
AbstractThe set L of essentially non-normal numbers of the unit interval (i.e., the set of real numb...
We examine the dimensions of the intersection of a subset E of an m-ary Cantor space Cm with the ima...
Abstract. We study the extent to which the Hausdorff dimension of a com-pact subset of an infinite-d...
Abstract. We introduce a new concept of dimension for metric spaces, the so called topological Hausd...
AbstractFor any real number θ, the set of all real numbers x for which there exists a constant c(x)>...
J. An (2013) proved that for any $s,t \geq 0$ such that $s + t = 1$, $\mathbf{Bad}(s,t)$ is $(34\sqr...
Thesis (Ph. D.)--University of Rochester. Department of Mathematics, 2020.We prove that fractal sets...