Adaptive estimation in the nonparametric random coefficients binary choice model by needlet thresholding
Abstract
In the random coefficients binary choice model, a binary variable equals 1 iff an index Xβ is positive.The vectors X and β are independent and belong to the sphere Sd-1 in Rd.We prove lower bounds on the minimax risk for estimation of the density f\β over Besov bodies where the loss is a power of the Lp(Sd-1) norm for 1 p ∞. We show that a hard thresholding estimator based on a needlet expansion with data-driven thresholds achieves these lower bounds up to logarithmic factors.
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