Add to ORKGThe Hurst exponent $H$ of long range correlated series can be estimated by means of the Detrending Moving Average (DMA) method. A computational tool defined within the algorithm is the generalized variance $ \sigma_{DMA}^2={1}/{(N-n)}\sum_i [y(i)-\widetilde{y}_n(i)]^2\:$, with $\widetilde{y}_n(i)= {1}/{n}\sum_{k}y(i-k)$ the moving average, $n$ the moving average window and $N$ the dimension of the stochastic series $y(i)$. This ability relies on the property of $\sigma_{DMA}^2$ to scale as $n^{2H}$. Here, we analytically show that $\sigma_{DMA}^2$ is equivalent to $C_H n^{2H}$ for $n\gg 1$ and provide an explicit expression for $C_H$
In order to estimate the Hurst exponent of long-range dependent time series numerous estimators such...
The Detrending Moving Average (DMA) algorithm can be implemented to estimate the Shannon entropy of ...
International audienceThe detrended fluctuation analysis (DFA) and its higher-order variant make it ...
Long-range correlation properties of financial stochastic time series y(i) have been, investigated w...
Long-range correlation properties of stochastic time series y(i) have been investigated by introduci...
Wemake the comparative study of scaling range properties for detrended fluctuation analysis (DFA), d...
In this work, higher-order moving average polynomials are defined by straightforward generalization ...
Detrended fluctuation analysis (DFA) and detrended moving average (DMA) are two scaling analysis met...
The Detrending Moving Average (DMA) algorithm has been widely used in its several variants for chara...
Notwithstanding the significant efforts to develop estimators of long-range correlations (LRC) and t...
Abstract—A short review of an algorithm, called Detrending Moving Average, to estimate the Hurst exp...
We present a bottom-up derivation of fluctuation analysis with detrending for the detection of long-...
There is much confusion in the literature over Hurst exponents. Recently, we took a step in the dire...
We focus on finite sample properties of two mostly used methods of Hurst exponent H estimation – R/S...
A major issue in statistical physics literature is the study of the long range dependence phenomenon...
In order to estimate the Hurst exponent of long-range dependent time series numerous estimators such...
The Detrending Moving Average (DMA) algorithm can be implemented to estimate the Shannon entropy of ...
International audienceThe detrended fluctuation analysis (DFA) and its higher-order variant make it ...
Long-range correlation properties of financial stochastic time series y(i) have been, investigated w...
Long-range correlation properties of stochastic time series y(i) have been investigated by introduci...
Wemake the comparative study of scaling range properties for detrended fluctuation analysis (DFA), d...
In this work, higher-order moving average polynomials are defined by straightforward generalization ...
Detrended fluctuation analysis (DFA) and detrended moving average (DMA) are two scaling analysis met...
The Detrending Moving Average (DMA) algorithm has been widely used in its several variants for chara...
Notwithstanding the significant efforts to develop estimators of long-range correlations (LRC) and t...
Abstract—A short review of an algorithm, called Detrending Moving Average, to estimate the Hurst exp...
We present a bottom-up derivation of fluctuation analysis with detrending for the detection of long-...
There is much confusion in the literature over Hurst exponents. Recently, we took a step in the dire...
We focus on finite sample properties of two mostly used methods of Hurst exponent H estimation – R/S...
A major issue in statistical physics literature is the study of the long range dependence phenomenon...
In order to estimate the Hurst exponent of long-range dependent time series numerous estimators such...
The Detrending Moving Average (DMA) algorithm can be implemented to estimate the Shannon entropy of ...
International audienceThe detrended fluctuation analysis (DFA) and its higher-order variant make it ...