Statistical inference and feasibility determination: a nonasymptotic approach

Abstract

We develop non-asymptotically justified methods for hypothesis testing about the p-dimensional coefficients θ* in (possibly nonlinear) regression models. Given a function h:\,Rpm, we consider the null hypothesis H0:\,h(θ*)∈ against the alternative hypothesis H1:\,h(θ*), where is a nonempty closed subset of Rm and h can be nonlinear in θ*. Our (nonasymptotic) control on the Type I and Type II errors holds for fixed n and does not rely on well-behaved estimation error or prediction error; in particular, when the number of restrictions in H0 is large relative to p-n, we show it is possible to bypass the sparsity assumption on θ* (for both Type I and Type II error control), regularization on the estimates of θ*, and other inherent challenges in an inverse problem. We also demonstrate an interesting link between our framework and Farkas' lemma (in math programming) under uncertainty, which points to some potential applications of our method outside traditional hypothesis testing.