2018
DOI: 10.5194/hess-22-1175-2018
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Evaluation of statistical methods for quantifying fractal scaling in water-quality time series with irregular sampling

Abstract: Abstract. River water-quality time series often exhibit fractal scaling, which here refers to autocorrelation that decays as a power law over some range of scales. Fractal scaling presents challenges to the identification of deterministic trends because (1) fractal scaling has the potential to lead to false inference about the statistical significance of trends and (2) the abundance of irregularly spaced data in water-quality monitoring networks complicates efforts to quantify fractal scaling. Traditional meth… Show more

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Cited by 5 publications
(5 citation statements)
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“…That would have required an assessment of the lag-1 autocorrelation which was hampered by the irregular sampling. Neither did we consider long-term memory and its effects on the statistical significance of the trends (Cohn and Lins, 2005;Zhang et al, 2018). Consequently, we did not consider the possible effects of the irregular sampling on the long-term memory (fractal scaling) of the water quality series either (Zhang et al, 2018).…”
Section: Theil-sen Estimator and Mann-kendall Testmentioning
confidence: 99%
See 2 more Smart Citations
“…That would have required an assessment of the lag-1 autocorrelation which was hampered by the irregular sampling. Neither did we consider long-term memory and its effects on the statistical significance of the trends (Cohn and Lins, 2005;Zhang et al, 2018). Consequently, we did not consider the possible effects of the irregular sampling on the long-term memory (fractal scaling) of the water quality series either (Zhang et al, 2018).…”
Section: Theil-sen Estimator and Mann-kendall Testmentioning
confidence: 99%
“…Neither did we consider long-term memory and its effects on the statistical significance of the trends (Cohn and Lins, 2005;Zhang et al, 2018). Consequently, we did not consider the possible effects of the irregular sampling on the long-term memory (fractal scaling) of the water quality series either (Zhang et al, 2018). Due to the limited number of samples per year and non-equidistant sampling, the seasonal Mann-Kendall test was not applicable (Fig.…”
Section: Theil-sen Estimator and Mann-kendall Testmentioning
confidence: 99%
See 1 more Smart Citation
“…That would have required an assessment of the lag-1 autocorrelation which was hampered by the irregular sampling. Neither did we consider long-term memory and its effects on the statistical significance of the trends (Cohn and Lins, 2005;Zhang et al, 2018). Consequently, we did not consider the possible effects of the irregular sampling on the long-term memory (fractal scaling) of the water quality series either (Zhang et al, 2018).…”
Section: Theil-sen Estimator and Mann-kendall Testmentioning
confidence: 99%
“…Neither did we consider long-term memory and its effects on the statistical significance of the trends (Cohn and Lins, 2005;Zhang et al, 2018). Consequently, we did not consider the possible effects of the irregular sampling on the long-term memory (fractal scaling) of the water quality series either (Zhang et al, 2018). Due to the limited number of samples per year and non-equidistant sampling, the seasonal Mann-Kendall test was not applicable (Fig.…”
Section: Theil-sen Estimator and Mann-kendall Testmentioning
confidence: 99%