A new class of random multiplicative and statistically self-similar measures is defned on IR. It is the limit of measure-valued martingales constructed by multiplying random functions attached to the points of a statistically self-similar Poisson point process in a strip of the plane. Several fundamental problems are solved, including the non-degeneracy and the distribution of the limit measure, mu; the finiteness of the (positive and negative) moments of the total mass of mu restricted to bounded intervals. Compared to the familiar canonical multifractals generated by multiplicative cascades, the new measures and their multifractal analysis exhibit strikingly novel features which are discussed in detail
We evaluate the scale at which the multifractal structure of some random Gibbs measures becomes disc...
International audienceWe show how a joint multifractal analysis of a collection of signals unravels ...
International audienceMultifractal behavior has been identified and mathematically established for l...
A new class of random multiplicative and statistically self-similar measures is defned on IR. It is ...
AbstractA nonnegative 1-periodic multifractal measure on R is obtained as infinite random product of...
Multifractal analysis is the mathematical study of the irregularity of objects or irregular function...
Les deux grandes classes de processus dont l'analyse multifractale a été réalisée sont les processus...
This paper investigates new properties concerning the multifractal structure of a class of statistic...
A class of α-stable, 0\textlessα\textless2, processes is obtained as a sum of ’up-and-down’ pulses d...
We investigate the properties of multifractal products of geometric Gaussian processes with possible...
AbstractWe begin with stochastic processes obtained as sums of “up-and-down” pulses with random mome...
27 pagesWe define a large class of multifractal random measures and processes with arbitrary log-inf...
In various fields, such as teletraffic and economics, measured time series have been reported to adh...
Multifractal analysis has matured into a widely used signal and image processing tool. Due to the st...
11 pages, 1 figure, final version,International audienceThe analysis of the linearization effect in ...
We evaluate the scale at which the multifractal structure of some random Gibbs measures becomes disc...
International audienceWe show how a joint multifractal analysis of a collection of signals unravels ...
International audienceMultifractal behavior has been identified and mathematically established for l...
A new class of random multiplicative and statistically self-similar measures is defned on IR. It is ...
AbstractA nonnegative 1-periodic multifractal measure on R is obtained as infinite random product of...
Multifractal analysis is the mathematical study of the irregularity of objects or irregular function...
Les deux grandes classes de processus dont l'analyse multifractale a été réalisée sont les processus...
This paper investigates new properties concerning the multifractal structure of a class of statistic...
A class of α-stable, 0\textlessα\textless2, processes is obtained as a sum of ’up-and-down’ pulses d...
We investigate the properties of multifractal products of geometric Gaussian processes with possible...
AbstractWe begin with stochastic processes obtained as sums of “up-and-down” pulses with random mome...
27 pagesWe define a large class of multifractal random measures and processes with arbitrary log-inf...
In various fields, such as teletraffic and economics, measured time series have been reported to adh...
Multifractal analysis has matured into a widely used signal and image processing tool. Due to the st...
11 pages, 1 figure, final version,International audienceThe analysis of the linearization effect in ...
We evaluate the scale at which the multifractal structure of some random Gibbs measures becomes disc...
International audienceWe show how a joint multifractal analysis of a collection of signals unravels ...
International audienceMultifractal behavior has been identified and mathematically established for l...