International audienceScale-free dynamics commonly appear in individual components of multivariate data. Yet, while the behavior of cross-components is crucial in modeling real-world multivariate data, their examination often suggests departures from exact multivariate self-similarity (also termed fractal connectivity). The present paper introduces a multivariate Gaussian stochastic process with Hadamard (i.e., entry-wise) self-similar scale-free dynamics, controlled by a matrix Hurst parameter H, that allows departures from fractal connectivity. The properties of its wavelet coefficients and wavelet spectrum are studied, enabling the estimation of H and of the fractal connectivity parameter. Furthermore, it permits the computation of close...
International audienceIn the modern world, systems are routinely monitored by multiple sensors, gene...
Fractal behavior and long-range dependence have been observed in an astonishing number of physical, ...
This review presents and compares different multiscale representations, based on either deterministi...
International audienceScale-free dynamics commonly appear in individual components of multivariate d...
International audienceWhile scale invariance is commonly observed in each component of real world mu...
International audienceWithin the framework of long memory multivariate processes, fractal connectivi...
In this paper we analyze a wavelet based method for the estimation of the Hurst parameter of synthet...
We introduce a scattering covariance matrix which provides non-Gaussian models of time-series having...
We study and compare the self-similar properties of the fluctuations, as extracted through wavelet c...
International audienceIn the modern world of "Big Data," dynamic signals are often multivariate and ...
The Random Parameter model was proposed to explain the structure of the covariance matrix in problem...
International audienceThe Fourier transform (or spectral analysis) has become a universal tool for d...
Physicists and mathematicians are intensely studying fractal sets of fractal curves. Mandelbrot advo...
International audienceA variety of resting state neuroimaging data tend to exhibit fractal behavior ...
International audienceIn the modern world, systems are routinely monitored by multiple sensors, gene...
Fractal behavior and long-range dependence have been observed in an astonishing number of physical, ...
This review presents and compares different multiscale representations, based on either deterministi...
International audienceScale-free dynamics commonly appear in individual components of multivariate d...
International audienceWhile scale invariance is commonly observed in each component of real world mu...
International audienceWithin the framework of long memory multivariate processes, fractal connectivi...
In this paper we analyze a wavelet based method for the estimation of the Hurst parameter of synthet...
We introduce a scattering covariance matrix which provides non-Gaussian models of time-series having...
We study and compare the self-similar properties of the fluctuations, as extracted through wavelet c...
International audienceIn the modern world of "Big Data," dynamic signals are often multivariate and ...
The Random Parameter model was proposed to explain the structure of the covariance matrix in problem...
International audienceThe Fourier transform (or spectral analysis) has become a universal tool for d...
Physicists and mathematicians are intensely studying fractal sets of fractal curves. Mandelbrot advo...
International audienceA variety of resting state neuroimaging data tend to exhibit fractal behavior ...
International audienceIn the modern world, systems are routinely monitored by multiple sensors, gene...
Fractal behavior and long-range dependence have been observed in an astonishing number of physical, ...
This review presents and compares different multiscale representations, based on either deterministi...