English

Higher order Sobol' indices

Numerical Analysis 2013-06-19 v1

Abstract

Sobol' indices measure the dependence of a high dimensional function on groups of variables defined on the unit cube [0,1]d[0,1]^d. They are based on the ANOVA decomposition of functions, which is an L2L^2 decomposition. In this paper we discuss generalizations of Sobol' indices which yield LpL^p measures of the dependence of ff on subsets of variables. Our interest is in values p>2p>2 because then variable importance becomes more about reaching the extremes of ff. We introduce two methods. One based on higher order moments of the ANOVA terms and another based on higher order norms of a spectral decomposition of ff, including Fourier and Haar variants. Both of our generalizations have representations as integrals over [0,1]kd[0,1]^{kd} for k1k\ge 1, allowing direct Monte Carlo or quasi-Monte Carlo estimation. We find that they are sensitive to different aspects of ff, and thus quantify different notions of variable importance.

Keywords

Cite

@article{arxiv.1306.4068,
  title  = {Higher order Sobol' indices},
  author = {Art Owen and Josef Dick and Su Chen},
  journal= {arXiv preprint arXiv:1306.4068},
  year   = {2013}
}
R2 v1 2026-06-22T00:35:28.407Z