Order-Induced Variance in the Moving-Range Sigma Estimator: A Total-Variance Decomposition

Abstract

I--MR charts commonly estimate the process standard deviation σ via the span-2 average moving range divided by the unbiasing constant d2; unlike the unbiased sample standard deviation (S/c4), this estimator depends on ordering through adjacency, so permuting a fixed sample changes it. We formalize this by introducing an independent uniformly random permutation and applying the law of total variance, yielding an exact decomposition into a values component (variance of the permutation mean) and an adjacency component (expected conditional variance over permutations). The permutation mean is order-invariant and equals /d2, where is the sample Gini mean difference. Under i.i.d.\ Normal sampling, both components admit closed forms; the adjacency fraction converges to 0.3813, and the familiar asymptotic efficiency loss relative to S/c4 is almost entirely an adjacency effect.