International audienceUsing the multivariate long memory (LM) model and Taylor expansions, we find the conditions for convergence of the wavelet correlations between two LM processes on an asymptotic value at low frequencies. These mathematical results, and a least squares estimator of LM parameters, are validated in simulations and applied to neurophysiological (human brain) and financial market time series. Both brain and market systems had multivariate LM properties including a "fractal connectivity" regime of scales over which wavelet correlations were invariantly close to their asymptotic value. This analysis provides efficient and unbiased estimation of long-term correlations in diverse dynamic networks
In the general setting of long-memory multivariate time series, the long-memory characteristics are ...
Conference PaperWe study <i>fractional Brownian motions in multifractal time</i>, a model for multif...
International audienceIn the general setting of long-memory multivariate time series, the long-memor...
International audienceWithin the framework of long memory multivariate processes, fractal connectivi...
This study investigates the long range dependence and correlation structures of some select stock ma...
This paper seeks to understand the long memory behaviour of global equity returns using novel method...
International audienceA variety of resting state neuroimaging data tend to exhibit fractal behavior ...
We propose a fluctuation analysis to quantify spatial correlations in complex networks. The approach...
This paper considers the situation where a stochastic process may display both long-range dependence...
International audienceMultivariate processes with long-range dependent properties are found in a lar...
In this paper, we study the long memory behavior of the hourly cryptocurrency returns during the COV...
Long memory models have received a significant amount of attention in the theoretical literature as ...
In this paper, we study the long memory behavior of Bitcoin, Litecoin, Ethereum, Ripple, Monero, and...
International audienceWhile scale invariance is commonly observed in each component of real world mu...
In the general setting of long-memory multivariate time series, the long-memory characteristics are ...
Conference PaperWe study <i>fractional Brownian motions in multifractal time</i>, a model for multif...
International audienceIn the general setting of long-memory multivariate time series, the long-memor...
International audienceWithin the framework of long memory multivariate processes, fractal connectivi...
This study investigates the long range dependence and correlation structures of some select stock ma...
This paper seeks to understand the long memory behaviour of global equity returns using novel method...
International audienceA variety of resting state neuroimaging data tend to exhibit fractal behavior ...
We propose a fluctuation analysis to quantify spatial correlations in complex networks. The approach...
This paper considers the situation where a stochastic process may display both long-range dependence...
International audienceMultivariate processes with long-range dependent properties are found in a lar...
In this paper, we study the long memory behavior of the hourly cryptocurrency returns during the COV...
Long memory models have received a significant amount of attention in the theoretical literature as ...
In this paper, we study the long memory behavior of Bitcoin, Litecoin, Ethereum, Ripple, Monero, and...
International audienceWhile scale invariance is commonly observed in each component of real world mu...
In the general setting of long-memory multivariate time series, the long-memory characteristics are ...
Conference PaperWe study <i>fractional Brownian motions in multifractal time</i>, a model for multif...
International audienceIn the general setting of long-memory multivariate time series, the long-memor...