cv: Sample Coefficient of Variation.

A numeric scalar -- the sample coefficient of variation.

Let \(\underline{x}\) denote a random sample of \(n\) observations from some distribution with mean \(\mu\) and standard deviation \(\sigma\).

Product Moment Coefficient of Variation (method="moments") The coefficient of variation (sometimes denoted CV) of a distribution is defined as the ratio of the standard deviation to the mean. That is: $$CV = \frac{\sigma}{\mu} \;\;\;\;\;\; (1)$$ The coefficient of variation measures how spread out the distribution is relative to the size of the mean. It is usually used to characterize positive, right-skewed distributions such as the lognormal distribution.

When sd.method="sqrt.unbiased", the coefficient of variation is estimated using the sample mean and the square root of the unbaised estimator of variance: $$\widehat{CV} = \frac{s}{\bar{x}} \;\;\;\;\;\; (2)$$ where $$\bar{x} = \frac{1}{n} \sum_{i=1}^n x_i \;\;\;\;\;\; (3)$$ $$s = [\frac{1}{n-1} \sum_{i=1}^n (x_i - \bar{x})^2]^{1/2} \;\;\;\;\;\; (4)$$ Note that the estimator of standard deviation in equation (4) is not unbiased.

When sd.method="moments", the coefficient of variation is estimated using the sample mean and the square root of the method of moments estimator of variance: $$\widehat{CV} = \frac{s_m}{\bar{x}} \;\;\;\;\;\; (5)$$ $$s = [\frac{1}{n} \sum_{i=1}^n (x_i - \bar{x})^2]^{1/2} \;\;\;\;\;\; (6)$$

L-Moment Coefficient of Variation (method="l.moments") Hosking (1990) defines an \(L\)-moment analog of the coefficient of variation (denoted the \(L\)-CV) as: $$\tau = \frac{l_2}{l_1} \;\;\;\;\;\; (7)$$ that is, the second \(L\)-moment divided by the first \(L\)-moment. He shows that for a positive-valued random variable, the \(L\)-CV lies in the interval (0, 1).

When l.moment.method="unbiased", the \(L\)-CV is estimated by: $$t = \frac{l_2}{l_1} \;\;\;\;\;\; (8)$$ that is, the unbiased estimator of the second \(L\)-moment divided by the unbiased estimator of the first \(L\)-moment.

When l.moment.method="plotting.position", the \(L\)-CV is estimated by: $$\tilde{t} = \frac{\tilde{l_2}}{\tilde{l_1}} \;\;\;\;\;\; (9)$$ that is, the plotting-position estimator of the second \(L\)-moment divided by the plotting-position estimator of the first \(L\)-moment.

See the help file for lMoment for more information on estimating \(L\)-moments.