English

Inference on Directionally Differentiable Functions

Statistics Theory 2016-01-14 v2 Statistics Theory

Abstract

This paper studies an asymptotic framework for conducting inference on parameters of the form ϕ(θ0)\phi(\theta_0), where ϕ\phi is a known directionally differentiable function and θ0\theta_0 is estimated by θ^n\hat \theta_n. In these settings, the asymptotic distribution of the plug-in estimator ϕ(θ^n)\phi(\hat \theta_n) can be readily derived employing existing extensions to the Delta method. We show, however, that the "standard" bootstrap is only consistent under overly stringent conditions -- in particular we establish that differentiability of ϕ\phi is a necessary and sufficient condition for bootstrap consistency whenever the limiting distribution of θ^n\hat \theta_n is Gaussian. An alternative resampling scheme is proposed which remains consistent when the bootstrap fails, and is shown to provide local size control under restrictions on the directional derivative of ϕ\phi. We illustrate the utility of our results by developing a test of whether a Hilbert space valued parameter belongs to a convex set -- a setting that includes moment inequality problems and certain tests of shape restrictions as special cases.

Keywords

Cite

@article{arxiv.1404.3763,
  title  = {Inference on Directionally Differentiable Functions},
  author = {Zheng Fang and Andres Santos},
  journal= {arXiv preprint arXiv:1404.3763},
  year   = {2016}
}

Comments

63 pages

R2 v1 2026-06-22T03:50:46.948Z