It is well known that when β is a Pisot number, the corresponding Bernoulli convolution ν(β) has Hausdorff dimension less than 1, i.e. that there exists a set A(β) with (ν(β))(A(β))=1 and dim_H(A(β))<1. We show explicitly how to construct for each Pisot number β such a set A(β)
Fix an integer N greater than or equal to 2. For a positive integer n is an element of N, let n = d(...
AbstractIn this paper, we give a systematical study of the local structures and fractal indices of t...
. We study the distributions F`;p of the random sums P 1 1 " n` n , where " 1 ; "...
It is well known that when ββ is a Pisot number, the corresponding Bernoulli convolution νβνβ has Ha...
The Bernoulli convolution with parameter λ ∈ (0, 1) is the probability measure μλ that is the law of...
The Bernoulli convolution νλ measure is shown to be absolutely continuous with L2 density for almost...
AbstractThe Bernoulli convolution νλ measure is shown to be absolutely continuous with L2 density fo...
Abstract. Let β> 1 and let m> β be an integer. Each x ∈ Iβ: = [0, m−1β−1] can be represented i...
AbstractWe study the Hausdorff dimension of a large class of sets in the real line defined in terms ...
We study the Hausdorff dimension of a large class of sets in the real line defined in terms of the d...
Abstract. The Bernoulli convolution associated to the real β> 1 and the probability vector (p0,.....
42 pages, 7 figuresInternational audienceIn this note we present an algorithm to obtain a uniform lo...
A well known result states that the set of numbers in base r in which the digits i occur with relati...
34 pagesThe Bernoulli convolution associated to the real $\beta>1$ andthe probability vector $(p_0,...
AbstractLet {Xn}∞n= 0 be a sequence of i.i.d. Bernoulli random variables (i.e., Xn takes values {0, ...
Fix an integer N greater than or equal to 2. For a positive integer n is an element of N, let n = d(...
AbstractIn this paper, we give a systematical study of the local structures and fractal indices of t...
. We study the distributions F`;p of the random sums P 1 1 " n` n , where " 1 ; "...
It is well known that when ββ is a Pisot number, the corresponding Bernoulli convolution νβνβ has Ha...
The Bernoulli convolution with parameter λ ∈ (0, 1) is the probability measure μλ that is the law of...
The Bernoulli convolution νλ measure is shown to be absolutely continuous with L2 density for almost...
AbstractThe Bernoulli convolution νλ measure is shown to be absolutely continuous with L2 density fo...
Abstract. Let β> 1 and let m> β be an integer. Each x ∈ Iβ: = [0, m−1β−1] can be represented i...
AbstractWe study the Hausdorff dimension of a large class of sets in the real line defined in terms ...
We study the Hausdorff dimension of a large class of sets in the real line defined in terms of the d...
Abstract. The Bernoulli convolution associated to the real β> 1 and the probability vector (p0,.....
42 pages, 7 figuresInternational audienceIn this note we present an algorithm to obtain a uniform lo...
A well known result states that the set of numbers in base r in which the digits i occur with relati...
34 pagesThe Bernoulli convolution associated to the real $\beta>1$ andthe probability vector $(p_0,...
AbstractLet {Xn}∞n= 0 be a sequence of i.i.d. Bernoulli random variables (i.e., Xn takes values {0, ...
Fix an integer N greater than or equal to 2. For a positive integer n is an element of N, let n = d(...
AbstractIn this paper, we give a systematical study of the local structures and fractal indices of t...
. We study the distributions F`;p of the random sums P 1 1 " n` n , where " 1 ; "...
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