The performance of a nonparametric regression method depends on the values chosen for one or more tuning parameters. Although much attention has been given to tuning parameter selection for recovering a mean response function, comparatively few studies have addressed tuning parameter selection for derivative estimation, and most of these studies have focused on a specific nonparametric regression method such as kernel smoothing. In this article, we propose using a generalized C-p (GC(p)) criterion to select tuning parameters for derivative estimation. This approach can be used with any nonparametric regression method that estimates derivatives linearly in the observed responses, including but not limited to kernel smoothing, local regression, and smoothing splines. The GC(p) criterion is a proxy for the unobservable sum of squared errors in estimating the derivative, and, thus, one can better estimate the derivative by selecting tuning parameters at which GC(p) is small. We provide both empirical support for GC(p) through simulation studies and theoretical justification in the form of an asymptotic efficiency result. We also describe a motivating practical application in analytic chemistry and assess the capabilities of GC(p) in that context. Supplementary materials for this article are available with the on-line journal.

• 出版日期2011-8