The base-k Copeland-Erdös sequence given by an infinite set A of positive integers is the infinite sequence CEk(A) formed by concatenating the base-k representations of the elements of A in numerical order. This paper concerns the following four quantities. • The finite-state dimension dimFS(CEk(A)), a finite-state version of classical Hausdorff dimension introduced in 2001. • The finite-state strong dimension DimFS(CEk(A)), a finite-state version of classical packing dimension introduced in 2004. This is a dual of dimFS(CEk(A)) satisfying DimFS(CEk(A)) ≥ dimFS(CEk(A)). • The zeta-dimension Dimζ(A), a kind of discrete fractal dimension discovered many times over the past few decades. • The lower zeta-dimension dimζ(A), a dual of Dimζ(A) sa...
AbstractA constructive version of Hausdorff dimension is developed using constructive supergales, wh...
In this paper, we prove the identity dimH(F)=d⋅dimH(α−1(F)) , where dimH denotes Hausdorff dimension...
We use entropy rates and Schur concavity to prove that, for every integer k ≥ 2, every nonzero ratio...
The base-k Copeland-Erdös sequence given by an infinite set A of positive integers is the infinite ...
The base-k Copeland-Erdös sequence given by an infinite set A of positive integers is the infinite ...
The base-k Copeland-Erdős sequence given by an infinite set A of positive integers is the infinite s...
AbstractThe base-k Copeland–Erdös sequence given by an infinite set A of positive integers is the in...
The zeta-dimension of a set A of positive integers is where Dimζ(A) = inf{s | ζA(s) < ∞}, ζA(s) ...
The zeta-dimension of a set A of positive integers is the infimum s such that the sum of the recipro...
AbstractConsider the problem of calculating the fractal dimension of a set X consisting of all infin...
Classical Hausdorff dimension (sometimes called fractal dimension) was recently effectivized using g...
AbstractClassical Hausdorff dimension (sometimes called fractal dimension) was recently effectivized...
Constructive dimension and constructive strong dimension are effectivizations of the Hausdorff and p...
This monograph gives a state-of-the-art and accessible treatment of a new general higher-dimensional...
International audienceIn this paper we provide two equivalent characterizations of the notion of fin...
AbstractA constructive version of Hausdorff dimension is developed using constructive supergales, wh...
In this paper, we prove the identity dimH(F)=d⋅dimH(α−1(F)) , where dimH denotes Hausdorff dimension...
We use entropy rates and Schur concavity to prove that, for every integer k ≥ 2, every nonzero ratio...
The base-k Copeland-Erdös sequence given by an infinite set A of positive integers is the infinite ...
The base-k Copeland-Erdös sequence given by an infinite set A of positive integers is the infinite ...
The base-k Copeland-Erdős sequence given by an infinite set A of positive integers is the infinite s...
AbstractThe base-k Copeland–Erdös sequence given by an infinite set A of positive integers is the in...
The zeta-dimension of a set A of positive integers is where Dimζ(A) = inf{s | ζA(s) < ∞}, ζA(s) ...
The zeta-dimension of a set A of positive integers is the infimum s such that the sum of the recipro...
AbstractConsider the problem of calculating the fractal dimension of a set X consisting of all infin...
Classical Hausdorff dimension (sometimes called fractal dimension) was recently effectivized using g...
AbstractClassical Hausdorff dimension (sometimes called fractal dimension) was recently effectivized...
Constructive dimension and constructive strong dimension are effectivizations of the Hausdorff and p...
This monograph gives a state-of-the-art and accessible treatment of a new general higher-dimensional...
International audienceIn this paper we provide two equivalent characterizations of the notion of fin...
AbstractA constructive version of Hausdorff dimension is developed using constructive supergales, wh...
In this paper, we prove the identity dimH(F)=d⋅dimH(α−1(F)) , where dimH denotes Hausdorff dimension...
We use entropy rates and Schur concavity to prove that, for every integer k ≥ 2, every nonzero ratio...