We introduce a scattering covariance matrix which provides non-Gaussian models of time-series having stationary increments. A complex wavelet transform computes signal variations at each scale. Dependencies across scales are captured by the joint covariance across time and scales of complex wavelet coefficients and their modulus. This covariance is nearly diagonalized by a second wavelet transform, which defines the scattering covariance. We show that this set of moments characterizes a wide range of non-Gaussian properties of multi-scale processes. This is analyzed for a variety of processes, including fractional Brownian motions, Poisson, multifractal random walks and Hawkes processes. We prove that self-similar processes have a scatterin...
Processes with stationary n-increments are known to be characterized by the stationarity of their co...
This thesis deals with multiscale modelling of the covariance pattern of discrete time series with t...
This paper considers the situation where a stochastic process may display both long-range dependence...
International audienceScattering moments provide nonparametric models of random processes with stati...
This review presents and compares different multiscale representations, based on either deterministi...
International audienceIn the modern world of "Big Data," dynamic signals are often multivariate and ...
Physicists and mathematicians are intensely studying fractal sets of fractal curves. Mandelbrot advo...
International audienceScale-free dynamics commonly appear in individual components of multivariate d...
The Lampertie transform establishes a one to one connection between stationary and self-similar proc...
By using chaos expansion into multiple stochastic integrals, we make a wavelet analysis of two self-...
International audienceThe Fourier transform (or spectral analysis) has become a universal tool for d...
AbstractThe multifractional Brownian motion (MBM) processes are locally self-similar Gaussian proces...
Introduction A stochastic process Y (t) is defined as self-similar with self-similarity parameter H...
International audienceIn the modern world, systems are routinely monitored by multiple sensors, gene...
In this paper we describe and analyze a class of multiscale stochastic pro-cesses which are modeled ...
Processes with stationary n-increments are known to be characterized by the stationarity of their co...
This thesis deals with multiscale modelling of the covariance pattern of discrete time series with t...
This paper considers the situation where a stochastic process may display both long-range dependence...
International audienceScattering moments provide nonparametric models of random processes with stati...
This review presents and compares different multiscale representations, based on either deterministi...
International audienceIn the modern world of "Big Data," dynamic signals are often multivariate and ...
Physicists and mathematicians are intensely studying fractal sets of fractal curves. Mandelbrot advo...
International audienceScale-free dynamics commonly appear in individual components of multivariate d...
The Lampertie transform establishes a one to one connection between stationary and self-similar proc...
By using chaos expansion into multiple stochastic integrals, we make a wavelet analysis of two self-...
International audienceThe Fourier transform (or spectral analysis) has become a universal tool for d...
AbstractThe multifractional Brownian motion (MBM) processes are locally self-similar Gaussian proces...
Introduction A stochastic process Y (t) is defined as self-similar with self-similarity parameter H...
International audienceIn the modern world, systems are routinely monitored by multiple sensors, gene...
In this paper we describe and analyze a class of multiscale stochastic pro-cesses which are modeled ...
Processes with stationary n-increments are known to be characterized by the stationarity of their co...
This thesis deals with multiscale modelling of the covariance pattern of discrete time series with t...
This paper considers the situation where a stochastic process may display both long-range dependence...