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Estimating Mean Dimensionality of Analysis of Variance Decompositions

Ruixue LiuRuixue Liu is a Doctoral Candidate and Art B. Owen is Professor , Department of Statistics, Stanford University, Stanford, CA 94305. This work was supported by National Science Foundation grants DMS-00-72445 and DMS-03-06612. The authors thank an associate editor and two anonymous referees for comments that have improved this articleArt B. OwenRuixue Liu is a Doctoral Candidate and Art B. Owen is Professor , Department of Statistics, Stanford University, Stanford, CA 94305. This work was supported by National Science Foundation grants DMS-00-72445 and DMS-03-06612. The authors thank an associate editor and two anonymous referees for comments that have improved this article
2006en
ABI

Abstract

Analysis of variance (ANOVA) is now often applied to functions defined on the unit cube, where it serves as a tool for the exploratory analysis of functions. The mean dimension of a function, defined as a natural weighted combination of its ANOVA mean squares, provides one measure of how hard or easy it is to integrate the function by quasi-Monte Carlo sampling. This article presents some new identities relating the mean dimension, and some analogously defined higher moments, to the variance importance measures of I.M. Sobol. As a result, we are able to measure the mean dimension of certain functions arising in computational finance. We produce an unbiased and nonnegative estimate of the variance contribution of the highest-order interaction that avoids the cancellation problems of previous estimates. In an application to extreme value theory, we find that, among other things, the minimum of d independent U[0, 1] random variables has a mean dimension of 2(d + 1)/(d + 3).

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