Adaptive estimation in the nonparametric random coefficients binary choice model by needlet thresholding
Statistics Theory
2017-11-29 v3 Statistics Theory
Abstract
In the random coefficients binary choice model, a binary variable equals 1 iff an index is positive.The vectors and are independent and belong to the sphere in .We prove lower bounds on the minimax risk for estimation of the density over Besov bodies where the loss is a power of the norm for . We show that a hard thresholding estimator based on a needlet expansion with data-driven thresholds achieves these lower bounds up to logarithmic factors.
Cite
@article{arxiv.1106.3503,
title = {Adaptive estimation in the nonparametric random coefficients binary choice model by needlet thresholding},
author = {Eric Gautier and Erwan Le Pennec},
journal= {arXiv preprint arXiv:1106.3503},
year = {2017}
}