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Let f be a density on the real line and let fₙ be the kernel estimate of f in which the smoothing factor is obtained by maximizing the cross-validated likelihood product according to the method of Duin and Habbema, Hermans and Vandenbroek. Under mild regularity conditions on the kernel and f, we show, among other things that |fₙ - f| 0 almost surely if and only if the sample extremes of f are strongly stable.
Broniatowski et al. (Fri,) studied this question.