Self-similarity has been widely used to model scale-free dynamics, with significant successes in numerous applications that are very different in nature. However, such successes have mostly remained confined to univariate data analysis while many applications in the modern “data deluge” era involve multivariate and dependent data. Operator fractional Brownian motion is a multivariate self-similar model that accounts for multivariate scale-free dynamics and characterizes data by means of a vector of self-similarity exponents (eigenvalues). This naturally raises the challenging question of testing the equality of exponents. Expanding on the recently proposed wavelet eigenvalue regression estimator of the vector of self-similarity exponents, i...
Let X be a continuous fractional Brownian motion with parameter of self-similarity H. Let \psi be a ...
Various wavelet-based estimators of self-similarity or long-range dependence scaling exponent are st...
Abstract—A statistical test is described for determining if scaling exponents vary over time. It is ...
International audienceSelf-similarity has been widely used to model scale-free dynamics, with signif...
International audienceBecause of the ever-increasing collections of multivariate data, multivariate ...
International audienceSelf-similarity has become a well-established modeling framework in several fi...
Symposium Signal and Image ProcessingInternational audienceMonitoring one system from multivariate d...
International audienceMultivariate selfsimilarity has become a classical tool to analyze collections...
Nowadays, because of the massive and systematic deployment of sensors, systems are routinely monitor...
While scale invariance is commonly observed in each component of real world multivariate signals, it...
Scale-free dynamics commonly appear in individual components of multivariate data. Yet, while the be...
International audienceIn the modern world, systems are routinely monitored by multiple sensors, gene...
International audienceThe self-similarity paradigm enables the analysis of scale-free temporal dynam...
International audienceIn the modern world of "Big Data," dynamic signals are often multivariate and ...
Let X be a continuous fractional Brownian motion with parameter of self-similarity H. Let \psi be a ...
Various wavelet-based estimators of self-similarity or long-range dependence scaling exponent are st...
Abstract—A statistical test is described for determining if scaling exponents vary over time. It is ...
International audienceSelf-similarity has been widely used to model scale-free dynamics, with signif...
International audienceBecause of the ever-increasing collections of multivariate data, multivariate ...
International audienceSelf-similarity has become a well-established modeling framework in several fi...
Symposium Signal and Image ProcessingInternational audienceMonitoring one system from multivariate d...
International audienceMultivariate selfsimilarity has become a classical tool to analyze collections...
Nowadays, because of the massive and systematic deployment of sensors, systems are routinely monitor...
While scale invariance is commonly observed in each component of real world multivariate signals, it...
Scale-free dynamics commonly appear in individual components of multivariate data. Yet, while the be...
International audienceIn the modern world, systems are routinely monitored by multiple sensors, gene...
International audienceThe self-similarity paradigm enables the analysis of scale-free temporal dynam...
International audienceIn the modern world of "Big Data," dynamic signals are often multivariate and ...
Let X be a continuous fractional Brownian motion with parameter of self-similarity H. Let \psi be a ...
Various wavelet-based estimators of self-similarity or long-range dependence scaling exponent are st...
Abstract—A statistical test is described for determining if scaling exponents vary over time. It is ...