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Multivariate nonparametric regression by least squares Jacobi polynomials approximations

Statistics Theory 2022-02-04 v1 Statistics Theory

Abstract

In this work, we study a random orthogonal projection based least squares estimator for the stable solution of a multivariate nonparametric regression (MNPR) problem. More precisely, given an integer d1d\geq 1 corresponding to the dimension of the MNPR problem, a positive integer N1N\geq 1 and a real parameter α12,\alpha\geq -\frac{1}{2}, we show that a fairly large class of dd-variate regression functions are well and stably approximated by its random projection over the orthonormal set of tensor product dd-variate Jacobi polynomials with parameters (α,α).(\alpha,\alpha). The associated uni-variate Jacobi polynomials have degree at most NN and their tensor products are orthonormal over U=[0,1]d,\mathcal U=[0,1]^d, with respect to the associated multivariate Jacobi weights. In particular, if we consider nn random sampling points Xi\mathbf X_i following the dd-variate Beta distribution, with parameters (α+1,α+1),(\alpha+1,\alpha+1), then we give a relation involving n,N,αn, N, \alpha to ensure that the resulting (N+1)d×(N+1)d(N+1)^d\times (N+1)^d random projection matrix is well conditioned. Moreover, we provide squared integrated as well as L2L^2-risk errors of this estimator. Precise estimates of these errors are given in the case where the regression function belongs to an isotropic Sobolev space Hs(Id),H^s(I^d), with s>d2.s> \frac{d}{2}. Also, to handle the general and practical case of an unknown distribution of the Xi,\mathbf X_i, we use Shepard's scattered interpolation scheme in order to generate fairly precise approximations of the observed data at nn i.i.d. sampling points Xi\mathbf X_i following a dd-variate Beta distribution. Finally, we illustrate the performance of our proposed multivariate nonparametric estimator by some numerical simulations with synthetic as well as real data.

Keywords

Cite

@article{arxiv.2202.01283,
  title  = {Multivariate nonparametric regression by least squares Jacobi polynomials approximations},
  author = {Asma BenSaber and Sophie Dabo-Niang and Abderrazek Karoui},
  journal= {arXiv preprint arXiv:2202.01283},
  year   = {2022}
}

Comments

25 pages, 5 figures

R2 v1 2026-06-24T09:16:41.979Z