Litcius/Paper detail

Robust analogs to the coefficient of variation

Chandima N. P. G. Arachchige, Luke A. Prendergast, Robert G. Staudte

2020Journal of Applied Statistics161 citationsDOIOpen Access PDF

Abstract

The coefficient of variation (CV) is commonly used to measure relative dispersion. However, since it is based on the sample mean and standard deviation, outliers can adversely affect it. Additionally, for skewed distributions the mean and standard deviation may be difficult to interpret and, consequently, that may also be the case for the CV. Here we investigate the extent to which quantile-based measures of relative dispersion can provide appropriate summary information as an alternative to the CV. In particular, we investigate two measures, the first being the interquartile range (in lieu of the standard deviation), divided by the median (in lieu of the mean), and the second being the median absolute deviation, divided by the median, as robust estimators of relative dispersion. In addition to comparing the influence functions of the competing estimators and their asymptotic biases and variances, we compare interval estimators using simulation studies to assess coverage.

Topics & Concepts

OutlierEstimatorStandard deviationMathematicsStatisticsCoefficient of variationRange (aeronautics)Variation (astronomy)Measure (data warehouse)Dispersion (optics)Standard errorSample mean and sample covarianceRelative standard deviationRobust statisticsPopulation meanEfficiencyLeast absolute deviationsSample size determinationAbsolute deviationResidualInterval (graph theory)Confidence intervalInterval estimationEconometricsSample (material)Advanced Statistical Methods and ModelsStatistical Methods and Bayesian InferenceStatistical Distribution Estimation and Applications