International audienceThis paper is devoted to the introduction of a new class of consistent estimators of the fractal dimension of locally self-similar Gaussian processes. These estimators are based on convex combinations of sample quantiles of discrete variations of a sample path over a discrete grid of the interval $[0,1]$. We derive the almost sure convergence and the asymptotic normality for these estimators. The key-ingredient is a Bahadur representation for sample quantiles of non-linear functions of Gaussians sequences with correlation function decreasing as $k^{-\alpha}L(k)$ for some $\alpha>0$ and some slowly varying function $L(\cdot)$
In this paper we analyze a wavelet based method for the estimation of the Hurst parameter of synthet...
International audienceA new nonparametric estimator of the local Hurst function of a multifractional...
International audienceIn this paper, we introduce a new class of estimators of the Hurst exponent of...
Scaling phenomena can be found in a variety of physical situations, ranging from applications in hyd...
In a companion paper (see Self-Similarity: Part I—Splines and Operators), we characterized the class...
An algorithm is proposed that allows to estimate the self-similarity parameter of a fractal k-dimens...
We analyze the asymptotic behavior of quadratic variations for a class of non-Gaussian self-similar ...
International audienceFine regularity of stochastic processes is usually measured in a local way by ...
This paper presents a generalized approach to the fractal analysis of self-similar random processes ...
AbstractA self-similar process Z(t) has stationary increments and is invariant in law under the tran...
For Gaussian processes there is a simple and well-known relationship between the fractal dimension o...
Fine regularity of stochastic processes is usually measured in a local way by local Hölder...
Introduction A stochastic process Y (t) is defined as self-similar with self-similarity parameter H...
We study and compare the self-similar properties of the fluctuations, as extracted through wavelet c...
AbstractIn this paper, a class of Gaussian processes, having locally the same fractal properties as ...
In this paper we analyze a wavelet based method for the estimation of the Hurst parameter of synthet...
International audienceA new nonparametric estimator of the local Hurst function of a multifractional...
International audienceIn this paper, we introduce a new class of estimators of the Hurst exponent of...
Scaling phenomena can be found in a variety of physical situations, ranging from applications in hyd...
In a companion paper (see Self-Similarity: Part I—Splines and Operators), we characterized the class...
An algorithm is proposed that allows to estimate the self-similarity parameter of a fractal k-dimens...
We analyze the asymptotic behavior of quadratic variations for a class of non-Gaussian self-similar ...
International audienceFine regularity of stochastic processes is usually measured in a local way by ...
This paper presents a generalized approach to the fractal analysis of self-similar random processes ...
AbstractA self-similar process Z(t) has stationary increments and is invariant in law under the tran...
For Gaussian processes there is a simple and well-known relationship between the fractal dimension o...
Fine regularity of stochastic processes is usually measured in a local way by local Hölder...
Introduction A stochastic process Y (t) is defined as self-similar with self-similarity parameter H...
We study and compare the self-similar properties of the fluctuations, as extracted through wavelet c...
AbstractIn this paper, a class of Gaussian processes, having locally the same fractal properties as ...
In this paper we analyze a wavelet based method for the estimation of the Hurst parameter of synthet...
International audienceA new nonparametric estimator of the local Hurst function of a multifractional...
International audienceIn this paper, we introduce a new class of estimators of the Hurst exponent of...