Add to ORKG37 pagesWe study the pointwise regularity properties of the Lévy fields introduced by T. Mori; these fields are the most natural generalization of Lévy processes to the multivariate setting. We determine their spectrum of singularities, and we show that their Hölder singularity sets satisfy a large intersection property in the sense of K. Falconer
International audienceIn this work, we investigate the fine regularity of Lévy processes using the 2...
Journal PaperThere are strong reasons to believe that the multifractal spectrum of DLA shows anomali...
Two of the main objects of study in multifractal analysis of measures are the coarse multifractal sp...
International audienceMultivariate multifractal analysis proposes to estimate the multivariate multi...
This is a survey on multifractal analysis with an emphasis on the multifractal geometry of geometric...
The main purpose of this thesis is the description of the size and large intersection properties of ...
We introduce a class of random …eld models with variable regularity/singularity order on multifracta...
This is a survey on multifractal analysis with an emphasis on the multifractal geometry of geometric...
We determine the Hölder regularity of Riemann's function at each point; we deduce from this analysis...
Natural images can be modelled as patchworks of homogeneous textures with rough contours. The follow...
International audienceWe show how a joint multifractal analysis of a collection of signals unravels ...
AbstractThere are strong reasons to believe that the multifractal spectrum of DLA shows anomalies wh...
The purpose of multifractal analysis is to compute the dimension of the sets where a function has a ...
Let $M_{\gamma}$ be a sub-critical Gaussian multiplicative chaos measure associated with a general l...
multifractal intersection schemes, work in progress, 1997 [31] L. Olsen, Multifractal geometry. A su...
International audienceIn this work, we investigate the fine regularity of Lévy processes using the 2...
Journal PaperThere are strong reasons to believe that the multifractal spectrum of DLA shows anomali...
Two of the main objects of study in multifractal analysis of measures are the coarse multifractal sp...
International audienceMultivariate multifractal analysis proposes to estimate the multivariate multi...
This is a survey on multifractal analysis with an emphasis on the multifractal geometry of geometric...
The main purpose of this thesis is the description of the size and large intersection properties of ...
We introduce a class of random …eld models with variable regularity/singularity order on multifracta...
This is a survey on multifractal analysis with an emphasis on the multifractal geometry of geometric...
We determine the Hölder regularity of Riemann's function at each point; we deduce from this analysis...
Natural images can be modelled as patchworks of homogeneous textures with rough contours. The follow...
International audienceWe show how a joint multifractal analysis of a collection of signals unravels ...
AbstractThere are strong reasons to believe that the multifractal spectrum of DLA shows anomalies wh...
The purpose of multifractal analysis is to compute the dimension of the sets where a function has a ...
Let $M_{\gamma}$ be a sub-critical Gaussian multiplicative chaos measure associated with a general l...
multifractal intersection schemes, work in progress, 1997 [31] L. Olsen, Multifractal geometry. A su...
International audienceIn this work, we investigate the fine regularity of Lévy processes using the 2...
Journal PaperThere are strong reasons to believe that the multifractal spectrum of DLA shows anomali...
Two of the main objects of study in multifractal analysis of measures are the coarse multifractal sp...