Add to ORKGIn this paper, we use a characterization of the mutual multifractal Hausdorff dimension in terms of auxiliary measures to investigate the projections of measures with small supports
International audienceVarious tools can be used to calculate or estimate the dimension of measures. ...
AbstractA self-conformal measure is a measure invariant under a set of conformal mappings. In this p...
In the thesis we pursue the term Hausdorff measure and dimension. Hausdorff measure is a non-negativ...
Many important definitions in the theory of multifractal measures on ℝd, such as the Lq-spectrum, L∞...
This paper relates multifractal features of a measure mu on IRn to those of the projection of the me...
The macroscopic Hausdorff dimension Dim H (E) of a set E ⊂ R d was introduced by Barlow and Taylor t...
A family of sets {F-d}(d) is said to be 'represented by the measure mu' if, for each d, the set F-d ...
Let mu be a Borel probability measure on R-d. We study the Hausdorff dimension and the packing dimen...
Let be a Borel probability measure on Rd. We study the Hausdorff dimension and the packing dimensio...
Intermediate dimensions were recently introduced to interpolate between the Hausdorff and box-counti...
International audienceIn good cases, we prove that the function $\tau$ which appears in multifractal...
Various tools can be used to calculate or estimate the dimension of measures. Using a probabilistic ...
Various tools can be used to calculate or estimate the dimension of measures. Using a probabilistic ...
AbstractLet X be a metric space and μ a Borel probability measure on X. For q, t ∈ R and E ⊆ X write...
Abstract. We study the extent to which the Hausdorff dimension and the dimension spectrum of a fract...
International audienceVarious tools can be used to calculate or estimate the dimension of measures. ...
AbstractA self-conformal measure is a measure invariant under a set of conformal mappings. In this p...
In the thesis we pursue the term Hausdorff measure and dimension. Hausdorff measure is a non-negativ...
Many important definitions in the theory of multifractal measures on ℝd, such as the Lq-spectrum, L∞...
This paper relates multifractal features of a measure mu on IRn to those of the projection of the me...
The macroscopic Hausdorff dimension Dim H (E) of a set E ⊂ R d was introduced by Barlow and Taylor t...
A family of sets {F-d}(d) is said to be 'represented by the measure mu' if, for each d, the set F-d ...
Let mu be a Borel probability measure on R-d. We study the Hausdorff dimension and the packing dimen...
Let be a Borel probability measure on Rd. We study the Hausdorff dimension and the packing dimensio...
Intermediate dimensions were recently introduced to interpolate between the Hausdorff and box-counti...
International audienceIn good cases, we prove that the function $\tau$ which appears in multifractal...
Various tools can be used to calculate or estimate the dimension of measures. Using a probabilistic ...
Various tools can be used to calculate or estimate the dimension of measures. Using a probabilistic ...
AbstractLet X be a metric space and μ a Borel probability measure on X. For q, t ∈ R and E ⊆ X write...
Abstract. We study the extent to which the Hausdorff dimension and the dimension spectrum of a fract...
International audienceVarious tools can be used to calculate or estimate the dimension of measures. ...
AbstractA self-conformal measure is a measure invariant under a set of conformal mappings. In this p...
In the thesis we pursue the term Hausdorff measure and dimension. Hausdorff measure is a non-negativ...