Multivariate Local Fitting with General Basis Functions

Einbeck, Jochen

doi:10.1007/s001800300140

Multivariate Local Fitting with General Basis Functions

Einbeck, Jochen

Authors

Professor Jochen Einbeck jochen.einbeck@durham.ac.uk
Professor

Abstract

In this paper we combine the concepts of local smoothing and fitting with basis functions for multivariate predictor variables. We start with arbitrary basis functions and show that the asymptotic variance at interior points is independent of the choice of the basis. Moreover we calculate the asymptotic variance at boundary points. We are not able to compute the asymptotic bias since a Taylor theorem for arbitrary basis functions does not exist. For this reason we focus on basis functions without interactions and derive a Taylor theorem which covers this case. This theorem enables us to calculate the asymptotic bias for interior as well as for boundary points. We demonstrate how advantage can be taken of the idea of local fitting with general basis functions by means of a simulated data set, and also provide a data-driven tool to optimize the basis.

Citation

Einbeck, J. (2003). Multivariate Local Fitting with General Basis Functions. Computational Statistics, 18(2), 185-203. https://doi.org/10.1007/s001800300140

Journal Article Type	Article
Publication Date	May 1, 2003
Deposit Date	Mar 20, 2008
Journal	Computational Statistics
Print ISSN	0943-4062
Electronic ISSN	1613-9658
Publisher	Springer
Peer Reviewed	Peer Reviewed
Volume	18
Issue	2
Pages	185-203
DOI	https://doi.org/10.1007/s001800300140
Keywords	Bias reduction, Local polynomial fitting, Multivariate kernel smoothing, Taylor expansion.
Publisher URL	http://www.maths.dur.ac.uk/~dma0je/Papers/einbeck_cs03.ps