Nonparametric inference in generalized functional linear models

TL;DR

This paper introduces a regularization-based nonparametric inference method for generalized functional linear models within a reproducing kernel Hilbert space framework, providing valid confidence and prediction intervals, hypothesis tests, and discovering a new Wilks phenomenon.

Contribution

It develops an easy-to-implement, general inference procedure for functional linear models that adapts to smoothness and predictor structure, with new theoretical insights.

Findings

Constructed asymptotically valid confidence and prediction intervals

Developed adaptive hypothesis testing procedures

Discovered a new Wilks phenomenon in functional linear models

Abstract

We propose a roughness regularization approach in making nonparametric inference for generalized functional linear models. In a reproducing kernel Hilbert space framework, we construct asymptotically valid confidence intervals for regression mean, prediction intervals for future response and various statistical procedures for hypothesis testing. In particular, one procedure for testing global behaviors of the slope function is adaptive to the smoothness of the slope function and to the structure of the predictors. As a by-product, a new type of Wilks phenomenon [Ann. Math. Stat. 9 (1938) 60-62; Ann. Statist. 29 (2001) 153-193] is discovered when testing the functional linear models. Despite the generality, our inference procedures are easy to implement. Numerical examples are provided to demonstrate the empirical advantages over the competing methods. A collection of technical tools such as integro-differential equation techniques [Trans. Amer. Math. Soc. (1927) 29 755-800; Trans. Amer. Math. Soc. (1928) 30 453-471; Trans. Amer. Math. Soc. (1930) 32 860-868], Stein's method [Ann. Statist. 41 (2013) 2786-2819] [Stein, Approximate Computation of Expectations (1986) IMS] and functional Bahadur representation [Ann. Statist. 41 (2013) 2608-2638] are employed in this paper.