Three-directional box-splines: characterization and efficient evaluation

Author

Condat, Laurent ; Van De Ville, Dimitri

Author_Institution

Lab. of Images & Signals, Inst. Nat. Polytech. de Grenoble

Volume

13

Issue

7

fYear

2006

fDate

7/1/2006 12:00:00 AM

Firstpage

417

Lastpage

420

Abstract

We propose a new characterization of three-directional box-splines, which are well adapted for interpolation and approximation on hexagonal lattices. Inspired by a construction already applied with success for exponential splines and hex-splines, we characterize a box-spline as a convolution of a generating function, which is a Green function of the spline´s associated differential operator, and a discrete filter that plays the role of a localization operator. This process leads to an elegant analytical expression of three-directional box-splines. It also brings along a particularly efficient implementation

Keywords

Green´s function methods; approximation theory; filtering theory; interpolation; splines (mathematics); Green´s function; approximation; differential operator; discrete filter; elegant analytical expression; hexagonal lattice; interpolation; three-directional box-spline; Character generation; Convolution; Filters; Green function; Image sampling; Interpolation; Lattices; Polynomials; Signal sampling; Spline; Approximation; box-splines; hexagonal sampling; interpolation; three-directional mesh;

fLanguage

English

Journal_Title

Signal Processing Letters, IEEE

Publisher

ieee

ISSN

1070-9908

Type

jour

DOI

10.1109/LSP.2006.871852

Filename

1642713