S
Stephan Zschiegner
Researcher at University of Giessen
Publications - 10
Citations - 5221
Stephan Zschiegner is an academic researcher from University of Giessen. The author has contributed to research in topics: Multifractal system & Knudsen number. The author has an hindex of 5, co-authored 10 publications receiving 4829 citations. Previous affiliations of Stephan Zschiegner include Leipzig University & University of Marburg.
Papers
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Journal ArticleDOI
Multifractal Detrended Fluctuation Analysis of Nonstationary Time Series
Jan W. Kantelhardt,Jan W. Kantelhardt,Stephan Zschiegner,Eva Koscielny-Bunde,Eva Koscielny-Bunde,Shlomo Havlin,Shlomo Havlin,Armin Bunde,H. Eugene Stanley +8 more
TL;DR: In this article, the authors developed a method for the multifractal characterization of nonstationary time series, which is based on a generalization of the detrended fluctuation analysis (DFA).
Journal ArticleDOI
Multifractal detrended fluctuation analysis of nonstationary time series
Jan W. Kantelhardt,Stephan Zschiegner,Eva Koscielny-Bunde,Armin Bunde,Shlomo Havlin,H. Eugene Stanley +5 more
TL;DR: In this article, the authors developed a method for the multifractal characterization of nonstationary time series, which is based on a generalization of the detrended fluctuation analysis (DFA).
Journal ArticleDOI
Multifractality of river runoff and precipitation: Comparison of fluctuation analysis and wavelet methods
Jan W. Kantelhardt,Diego Rybski,Stephan Zschiegner,Stephan Zschiegner,Peter Braun,Eva Koscielny-Bunde,Eva Koscielny-Bunde,Valerie Livina,Shlomo Havlin,Armin Bunde +9 more
TL;DR: In this article, the authors compare the results for the multifractal detrended fluctuation analysis method with the results of the wavelet-transform modulus maxima technique and obtain agreement within the error margins.
Multifractal detrended $uctuation analysis of nonstationary time series
Jan W. Kantelhardt,Stephan Zschiegner,Eva Koscielny-Bunde,Shlomo Havlin,Armin Bunde,H. Eugene Stanley +5 more
TL;DR: In this paper, the authors developed a method for the multifractal characterization of nonstationary time series, which is based on a generalization of the detrended $uctuation analysis (DFA).
Journal ArticleDOI
Lambert diffusion in porous media in the Knudsen regime: equivalence of self-diffusion and transport diffusion.
TL;DR: In this paper, the diffusion problem can be mapped onto Levy walks and the roughness dependence of the diffusion coefficients of self-and transport diffusion, respectively, is discussed. But the authors do not consider diffusion in nanopores with different types of roughness under the exclusion of mutual molecular collisions.