AbstractIn this paper we determine the multifractal nature of almost every function (in the prevalence setting) in a given Sobolev or Besov space according to different regularity exponents. These regularity criteria are based on local Lp regularity or on wavelet coefficients and give a precise information on pointwise behavior
AbstractThe purpose of multifractal analysis is to evaluate the Hausdorff dimensions d(h) of the set...
Abstract. We study functions which are selfsimilar under the action of some nonlinear dynamical syst...
International audienceThe purpose of multifractal analysis is to evaluate the Hausdorff dimensions d...
AbstractIn this paper we determine the multifractal nature of almost every function (in the prevalen...
International audienceIn this paper we determine the multifractal nature of almost every function (i...
International audienceIn this paper we determine the multifractal nature of almost every function (i...
We show that almost every function (in the sense of prevalence) in a Sobolev space is multifractal: ...
In this article, we investigate the pointwise behaviors of functions on the Heisenberg group. We fin...
As surprising as it may seem, there exist functions of C∞(R) which are nowhere analytic. When such a...
Abstract. In this article, we investigate the pointwise behaviors of functions on the Heisenberg gro...
Abstract. In this article, we investigate the pointwise behaviors of functions on the Heisenberg gro...
International audienceIn this course, we give the basics of the part of multifractal theory that int...
AbstractWe give criteria of pointwise regularity for expansions on Haar or Schauder basis (or spline...
The first result involving Hölder regularity and the Baire's categories theorem goes back to 1931. T...
The first result involving Hölder regularity and the Baire's categories theorem goes back to 1931. T...
AbstractThe purpose of multifractal analysis is to evaluate the Hausdorff dimensions d(h) of the set...
Abstract. We study functions which are selfsimilar under the action of some nonlinear dynamical syst...
International audienceThe purpose of multifractal analysis is to evaluate the Hausdorff dimensions d...
AbstractIn this paper we determine the multifractal nature of almost every function (in the prevalen...
International audienceIn this paper we determine the multifractal nature of almost every function (i...
International audienceIn this paper we determine the multifractal nature of almost every function (i...
We show that almost every function (in the sense of prevalence) in a Sobolev space is multifractal: ...
In this article, we investigate the pointwise behaviors of functions on the Heisenberg group. We fin...
As surprising as it may seem, there exist functions of C∞(R) which are nowhere analytic. When such a...
Abstract. In this article, we investigate the pointwise behaviors of functions on the Heisenberg gro...
Abstract. In this article, we investigate the pointwise behaviors of functions on the Heisenberg gro...
International audienceIn this course, we give the basics of the part of multifractal theory that int...
AbstractWe give criteria of pointwise regularity for expansions on Haar or Schauder basis (or spline...
The first result involving Hölder regularity and the Baire's categories theorem goes back to 1931. T...
The first result involving Hölder regularity and the Baire's categories theorem goes back to 1931. T...
AbstractThe purpose of multifractal analysis is to evaluate the Hausdorff dimensions d(h) of the set...
Abstract. We study functions which are selfsimilar under the action of some nonlinear dynamical syst...
International audienceThe purpose of multifractal analysis is to evaluate the Hausdorff dimensions d...
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