Asymptotic Equivalence for Nonparametric Regression
Abstract
We consider a nonparametric model En, generated by independent observations Xi, i=1,...,n, with densities p(x,θi), i=1,...,n, the parameters of which θ i=f(i/n)∈ are driven by the values of an unknown function f:[0,1]→ in a smoothness class. The main result of the paper is that, under regularity assumptions, this model can be approximated, in the sense of the Le Cam deficiency pseudodistance, by a nonparametric Gaussian shift model Yi= (f(i/n))+ i, where 1,..., n are i.i.d. standard normal r.v.'s, the function (θ ): → R satisfies (θ )=I(θ ) and I(θ ) is the Fisher information corresponding to the density p(x,θ ).
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