Nonparametric estimation by convex programming

Abstract

The problem we concentrate on is as follows: given (1) a convex compact set X in Rn, an affine mapping x A(x), a parametric family \pμ(·)\ of probability densities and (2) N i.i.d. observations of the random variable ω, distributed with the density pA(x)(·) for some (unknown) x∈ X, estimate the value gTx of a given linear form at x. For several families \pμ(·)\ with no additional assumptions on X and A, we develop computationally efficient estimation routines which are minimax optimal, within an absolute constant factor. We then apply these routines to recovering x itself in the Euclidean norm.