English

Very Low Truncation Dimension for High Dimensional Integration Under Modest Error Demand

Numerical Analysis 2015-09-16 v2

Abstract

We consider the problem of numerical integration for weighted anchored and ANOVA Sobolev spaces of ss-variate functions. Here ss is large including s=s=\infty. Under the assumption of sufficiently fast decaying weights, we prove in a constructive way that such integrals can be approximated by quadratures for functions fkf_k with only kk variables, where k=k(ε)k=k(\varepsilon) depends solely on the error demand ε\varepsilon and is surprisingly small when ss is sufficiently large relative to ε\varepsilon. This holds, in particular, for s=s=\infty and arbitrary ε\varepsilon since then k(ε)<k(\varepsilon)<\infty for all ε\varepsilon. Moreover k(ε)k(\varepsilon) does not depend on the function being integrated, i.e., is the same for all functions from the unit ball of the space.

Keywords

Cite

@article{arxiv.1506.02458,
  title  = {Very Low Truncation Dimension for High Dimensional Integration Under Modest Error Demand},
  author = {P. Kritzer and F. Pillichshammer and G. W. Wasilkowski},
  journal= {arXiv preprint arXiv:1506.02458},
  year   = {2015}
}
R2 v1 2026-06-22T09:49:08.645Z