Fractal investigation of time series is very complex for several reasons. Due to the existence of fully continuous model, on which the majority of conventional methods are based, the quality of Hurst exponent estimate is often influenced by the number of input data and its sampling rate. In this work, we present a novel approach of unbiased Hurst exponent estimate that is suitable especially for short time series. The crucial idea is deriving the discrete fractional Brownian bridge and its statistical properties that can be subsequently used for model parameter estimation. For the verification and demonstration of efficiency of the method, several generators of fractional Gaussian noise are presented and tested
International audienceSome real-world phenomena in geo-science, micro-economy, and turbulence, to na...
International audienceIn this paper, we introduce a new class of estimators of the Hurst exponent of...
Hurst exponents depict the long memory of a time series. For human-dependent phenomena, as in financ...
We consider a model based on the fractional Brownian motion under the influence of noise. We impleme...
D.Phil. (Mathematical Statistics)Fractional Brownian motion and its increment process, fractional Ga...
In the paper consistent estimates of the Hurst parameter of fractional Brownian motion are obtained ...
In this paper, we build an estimator of the Hurst exponent of a fractional Lévy motion based on its ...
[[abstract]]© 2002 Institute of Electrical and Electronics Engineers-The purpose of this paper is to...
<p>Along with estimates for the simulated time series (blue), estimates for the time series integral...
We estimate the Hurst parameter H of a fractional Brownian motion from discrete noisy data observed ...
This paper aims to efficiently implement the maximum likelihood estimator (MLE) for Hurst exponent, ...
The aim of this thesis is to provide a characterization of the statistical properties of estimator o...
We combine two existing estimators of the local Hurst exponent to improve both the goodness of fit a...
Fractional Brownian motion (fBm) has been used as a theoretical framework to study real-time series ...
International audienceWe estimate the Hurst parameter H of a fractional Brownian motion from discret...
International audienceSome real-world phenomena in geo-science, micro-economy, and turbulence, to na...
International audienceIn this paper, we introduce a new class of estimators of the Hurst exponent of...
Hurst exponents depict the long memory of a time series. For human-dependent phenomena, as in financ...
We consider a model based on the fractional Brownian motion under the influence of noise. We impleme...
D.Phil. (Mathematical Statistics)Fractional Brownian motion and its increment process, fractional Ga...
In the paper consistent estimates of the Hurst parameter of fractional Brownian motion are obtained ...
In this paper, we build an estimator of the Hurst exponent of a fractional Lévy motion based on its ...
[[abstract]]© 2002 Institute of Electrical and Electronics Engineers-The purpose of this paper is to...
<p>Along with estimates for the simulated time series (blue), estimates for the time series integral...
We estimate the Hurst parameter H of a fractional Brownian motion from discrete noisy data observed ...
This paper aims to efficiently implement the maximum likelihood estimator (MLE) for Hurst exponent, ...
The aim of this thesis is to provide a characterization of the statistical properties of estimator o...
We combine two existing estimators of the local Hurst exponent to improve both the goodness of fit a...
Fractional Brownian motion (fBm) has been used as a theoretical framework to study real-time series ...
International audienceWe estimate the Hurst parameter H of a fractional Brownian motion from discret...
International audienceSome real-world phenomena in geo-science, micro-economy, and turbulence, to na...
International audienceIn this paper, we introduce a new class of estimators of the Hurst exponent of...
Hurst exponents depict the long memory of a time series. For human-dependent phenomena, as in financ...