<p>Only situated agents present both a pink noise exponent and a wide multifractal exponent. Decoupled agents appear to present a 1/<i>f</i> exponent but this is a misleading sign of SOC because they show no multifractality.</p
Some physiological series, like the cardiovascular signals, show multifractal structures that depend...
11 pages, 1 figure, final version,International audienceThe analysis of the linearization effect in ...
Plot of individual series’ multifractal analysis indicating, on the y-axis, how many values of q ser...
<p>Whereas 1/<i>f</i> patterns are robust for the situated agents the fractal exponents are drastica...
<p>According to the values of the scaling exponents, the seven species listed are grouped into two c...
Multifractal probability distributions are defined as mixture of n monofractal distributions. The ex...
We demonstrate analytically and numerically the possibility that the fractal property of a scale-fre...
International audienceMultifractal analysis studies signals, functions, images or fields via the flu...
International audienceScale invariance is a widely used concept to analyze real-world data from many...
The multifractal dimensionality Dq as a function of q expresses the distribution of measure over spa...
We calculate the multifractal spectrum and mass exponents for super-Brownian motion in three or more...
<p>Exponents describing the fractal dimensionality for each of the ratios employed in Experiments 1,...
We introduce the mathematical concept of multifractality and describe various multifractal spectra f...
‘‘Divergence of high moments and dimension of the carrier’ ’ is the subtitle of Mandelbrot’s 1974 se...
We introduce the mathematical concept of multifractality and describe various multifractal spectra f...
Some physiological series, like the cardiovascular signals, show multifractal structures that depend...
11 pages, 1 figure, final version,International audienceThe analysis of the linearization effect in ...
Plot of individual series’ multifractal analysis indicating, on the y-axis, how many values of q ser...
<p>Whereas 1/<i>f</i> patterns are robust for the situated agents the fractal exponents are drastica...
<p>According to the values of the scaling exponents, the seven species listed are grouped into two c...
Multifractal probability distributions are defined as mixture of n monofractal distributions. The ex...
We demonstrate analytically and numerically the possibility that the fractal property of a scale-fre...
International audienceMultifractal analysis studies signals, functions, images or fields via the flu...
International audienceScale invariance is a widely used concept to analyze real-world data from many...
The multifractal dimensionality Dq as a function of q expresses the distribution of measure over spa...
We calculate the multifractal spectrum and mass exponents for super-Brownian motion in three or more...
<p>Exponents describing the fractal dimensionality for each of the ratios employed in Experiments 1,...
We introduce the mathematical concept of multifractality and describe various multifractal spectra f...
‘‘Divergence of high moments and dimension of the carrier’ ’ is the subtitle of Mandelbrot’s 1974 se...
We introduce the mathematical concept of multifractality and describe various multifractal spectra f...
Some physiological series, like the cardiovascular signals, show multifractal structures that depend...
11 pages, 1 figure, final version,International audienceThe analysis of the linearization effect in ...
Plot of individual series’ multifractal analysis indicating, on the y-axis, how many values of q ser...