Let (X,d) be a metric space and (Ω,d) a compact subspace of X which supports a non-atomic finite measure m. We consider ‘natural’ classes of badly approximable subsets of Ω. Loosely speaking, these consist of points in Ω which ‘stay clear’ of some given set of points in X. The classical set Bad of ‘badly approximable’ numbers in the theory of Diophantine approximation falls within our framework as do the sets Bad(i,j) of simultaneously badly approximable numbers. Under various natural conditions we prove that the badly approximable subsets of Ω have full Hausdorff dimension. Applications of our general framework include those from number theory (classical, complex, p-adic and formal power series) and dynamical systems (iterated function sch...
We consider a problem originating both from circle coverings and badly approximable numbers in the c...
We show that affine coordinate subspaces of dimension at least two in Euclidean space are of Khintc...
For any j_1,...,j_n>0 with j_1+...+j_n=1 and any x \in R^n, we consider the set of points y \in R^n ...
Let (X,d) be a metric space and (Ω,d) a compact subspace of X which supports a non-atomic finite mea...
AbstractLet (X,d) be a metric space and (Ω,d) a compact subspace of X which supports a non-atomic fi...
In many areas ofmathematics problems of small divisors, or exceptional sets on which certain desired...
Diophantine approximation is traditionally the study of how well real numbers are approximated by ra...
We consider badly approximable numbers in the case of dyadic diophantine approximation. For the unit...
The use of Hausdorff measures and dimension in the theory of Diophantine approximation dates back to...
The thesis takes as starting point diophantine approximation with focus on the area of badly approxi...
Addressing a problem of Davenport we show that any finite intersection of the sets of weighted badly...
We compute the Hausdorff dimension of sets of very well approximable vectors on rational quadrics. W...
AbstractFundamental questions in Diophantine approximation are related to the Hausdorff dimension of...
AbstractLetm,nbe positive integers and letψ:Zn→R be a non-negative function. LetW(m, n; ψ) be the se...
SIGLEAvailable from British Library Document Supply Centre- DSC:DX174386 / BLDSC - British Library D...
We consider a problem originating both from circle coverings and badly approximable numbers in the c...
We show that affine coordinate subspaces of dimension at least two in Euclidean space are of Khintc...
For any j_1,...,j_n>0 with j_1+...+j_n=1 and any x \in R^n, we consider the set of points y \in R^n ...
Let (X,d) be a metric space and (Ω,d) a compact subspace of X which supports a non-atomic finite mea...
AbstractLet (X,d) be a metric space and (Ω,d) a compact subspace of X which supports a non-atomic fi...
In many areas ofmathematics problems of small divisors, or exceptional sets on which certain desired...
Diophantine approximation is traditionally the study of how well real numbers are approximated by ra...
We consider badly approximable numbers in the case of dyadic diophantine approximation. For the unit...
The use of Hausdorff measures and dimension in the theory of Diophantine approximation dates back to...
The thesis takes as starting point diophantine approximation with focus on the area of badly approxi...
Addressing a problem of Davenport we show that any finite intersection of the sets of weighted badly...
We compute the Hausdorff dimension of sets of very well approximable vectors on rational quadrics. W...
AbstractFundamental questions in Diophantine approximation are related to the Hausdorff dimension of...
AbstractLetm,nbe positive integers and letψ:Zn→R be a non-negative function. LetW(m, n; ψ) be the se...
SIGLEAvailable from British Library Document Supply Centre- DSC:DX174386 / BLDSC - British Library D...
We consider a problem originating both from circle coverings and badly approximable numbers in the c...
We show that affine coordinate subspaces of dimension at least two in Euclidean space are of Khintc...
For any j_1,...,j_n>0 with j_1+...+j_n=1 and any x \in R^n, we consider the set of points y \in R^n ...