A Grid-Rate Condition for Valid Uniform Inference

Abstract

Conducting uniform inference on a continuous functional F defined on a compact subset X of Rd involves specifying Lnd nodes for estimation and the construction of confidence bands. While asymptotically valid inference requires Ln to increase with n, existing fixed-L rules of thumb and heuristic data-driven approaches lack formal justification. This paper shows that, for functions within a Donsker class, the simple grid-growth condition rn(1/4)/Ln -> 0, equivalently Ln grows faster than rn(1/4), is sufficient for valid inference on twice continuously differentiable functions whose estimators satisfy rn(1/2)(Fhat - F) = Op(1).