In this paper, we propose a method using continuous wavelets to study the multivariate fractional Brownian motion through the deviations of the transformed random process to find an efficient estimate of Hurst exponent using eigenvalue regression of the covariance matrix. The results of simulations experiments shown that the performance of the proposed estimator was efficient in bias but the variance get increase as signal change from short to long memory the MASE increase relatively. The estimation process was made by calculating the eigenvalues for the variance-covariance matrix of Meyer’s continuous wavelet details coefficients
Conference PaperThe multifractal spectrum characterizes the scaling and singularity structures of si...
International audienceSelf-similarity has been widely used to model scale-free dynamics, with signif...
Conference PaperWe study <i>fractional Brownian motions in multifractal time</i>, a model for multif...
Abstract: Wavelet based estimators of the H parameter for fractional Brownian motion (fBm) is known ...
In this paper, we build an estimator of the Hurst exponent of a fractional Lévy motion based on its ...
This article is dedicated for Fractal Brownian process analysis using Continuous Wavelet Transform (...
The work developed in the paper concerns the multivariate fractional Brownian motion (mfBm) viewed t...
Let X be a continuous fractional Brownian motion with parameter of self-similarity H. Let \psi be a ...
According to research results, Wavelet coecients of Fractal Brownian process upper interval bound de...
International audienceThe work developed in the paper concerns the multivariate fractional Brownian ...
<p>Along with estimates for the simulated time series (blue), estimates for the time series integral...
International audienceIn the modern world of "Big Data," dynamic signals are often multivariate and ...
Processes with stationary n-increments are known to be characterized by the stationarity of their co...
This work provides asymptotic properties of the autocorrelation functions of the wavelet packet coef...
The multifractal spectrum characterizes the scaling and singularity structures of signals and proves...
Conference PaperThe multifractal spectrum characterizes the scaling and singularity structures of si...
International audienceSelf-similarity has been widely used to model scale-free dynamics, with signif...
Conference PaperWe study <i>fractional Brownian motions in multifractal time</i>, a model for multif...
Abstract: Wavelet based estimators of the H parameter for fractional Brownian motion (fBm) is known ...
In this paper, we build an estimator of the Hurst exponent of a fractional Lévy motion based on its ...
This article is dedicated for Fractal Brownian process analysis using Continuous Wavelet Transform (...
The work developed in the paper concerns the multivariate fractional Brownian motion (mfBm) viewed t...
Let X be a continuous fractional Brownian motion with parameter of self-similarity H. Let \psi be a ...
According to research results, Wavelet coecients of Fractal Brownian process upper interval bound de...
International audienceThe work developed in the paper concerns the multivariate fractional Brownian ...
<p>Along with estimates for the simulated time series (blue), estimates for the time series integral...
International audienceIn the modern world of "Big Data," dynamic signals are often multivariate and ...
Processes with stationary n-increments are known to be characterized by the stationarity of their co...
This work provides asymptotic properties of the autocorrelation functions of the wavelet packet coef...
The multifractal spectrum characterizes the scaling and singularity structures of signals and proves...
Conference PaperThe multifractal spectrum characterizes the scaling and singularity structures of si...
International audienceSelf-similarity has been widely used to model scale-free dynamics, with signif...
Conference PaperWe study <i>fractional Brownian motions in multifractal time</i>, a model for multif...