English

Adaptive exact recovery in sparse nonparametric models

Statistics Theory 2025-07-03 v2 Statistics Theory

Abstract

We observe an unknown regression function of dd variables f(t)f(\boldsymbol{t}), t[0,1]d\boldsymbol{t} \in[0,1]^d, in the Gaussian white noise model of intensity ε>0\varepsilon>0. We assume that the function ff is regular and that it is a sum of kk-variate functions, where kk varies from 11 to ss (1sd1\leq s\leq d). These functions are unknown to us and only few of them are nonzero. In this article, we address the problem of identifying the nonzero components of ff in the case when d=dεd=d_\varepsilon\to \infty as ε0\varepsilon\to 0 and ss is either fixed or s=sεs=s_\varepsilon\to \infty, s=o(d)s=o(d) as ε\varepsilon\to \infty. This may be viewed as a variable selection problem. We derive the conditions when exact variable selection in the model at hand is possible and provide a selection procedure that achieves this type of selection. The procedure is adaptive to a degree of model sparsity described by the sparsity parameter β(0,1)\beta\in(0,1). We also derive conditions that make the exact variable selection impossible. Our results augment previous work in this area.

Cite

@article{arxiv.2411.04320,
  title  = {Adaptive exact recovery in sparse nonparametric models},
  author = {Natalia Stepanova and Marie Turcicova},
  journal= {arXiv preprint arXiv:2411.04320},
  year   = {2025}
}

Comments

24 pages, 0 figures

R2 v1 2026-06-28T19:50:47.521Z