Sharp Debiasing for Smooth Functional Estimation in Banach Spaces

Abstract

This paper studies the estimation of smooth functionals f(θ) of a mean parameter θ = EP[W] for a distribution P on a general Banach space. We propose a cross-fitted estimator based on a single sample splitting and establish non-asymptotic moment bounds and Berry--Ess\'een bounds for both m-smooth and infinitely smooth functionals under the finite moment assumptions. Our framework is applied to precision matrix estimation and the inference of projection parameters in high-dimensional regression. In these Euclidean settings, the proposed estimators achieve asymptotic normality under the dimension regime d 2(en) = o(n) without requiring any structural assumptions (e.g., sparsity). We discuss computational relaxations that enables polynomial-time implementation for a range of matrix functionals.