Approximating Symmetrized Estimators of Scatter via Balanced Incomplete U-Statistics

Abstract

We derive limiting distributions of symmetrized estimators of scatter, where instead of all n(n-1)/2 pairs of the n observations we only consider nd suitably chosen pairs, 1 d < n/2. It turns out that the resulting estimators are asymptotically equivalent to the original one whenever d = d(n) ∞ at arbitrarily slow speed. We also investigate the asymptotic properties for arbitrary fixed d. These considerations and numerical examples indicate that for practical purposes, moderate fixed values of d between,say, 10 and 20 yield already estimators which are computationally feasible and rather close to the original ones.