Title of article
Kernel density estimation on the torus
Author/Authors
Di Marzio، نويسنده , , Marco and Panzera، نويسنده , , Agnese and Taylor، نويسنده , , Charles C.، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2011
Pages
18
From page
2156
To page
2173
Abstract
Kernel density estimation for multivariate, circular data has been formulated only when the sample space is the sphere, but theory for the torus would also be useful. For data lying on a d-dimensional torus ( d ⩾ 1 ) , we discuss kernel estimation of a density, its mixed partial derivatives, and their squared functionals. We introduce a specific class of product kernels whose order is suitably defined in such a way to obtain L2-risk formulas whose structure can be compared to their Euclidean counterparts. Our kernels are based on circular densities; however, we also discuss smaller bias estimation involving negative kernels which are functions of circular densities. Practical rules for selecting the smoothing degree, based on cross-validation, bootstrap and plug-in ideas are derived. Moreover, we provide specific results on the use of kernels based on the von Mises density. Finally, real-data examples and simulation studies illustrate the findings.
Keywords
efficiency , Conformation angles , Mixed derivatives , Toroidal kernels , Sin-order , von Mises density , Twicing , Circular symmetric unimodal families , density functionals , Minimax bounds
Journal title
Journal of Statistical Planning and Inference
Serial Year
2011
Journal title
Journal of Statistical Planning and Inference
Record number
2221402
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