Minimum support interpolators with optimum approximation properties

Author

Blu, Thierry ; Thevenaz, Philippe ; Unser, Michael

Author_Institution

Biomed. Imaging Group, Fed. Inst. of Technol., Lausanne, Switzerland

fYear

1998

fDate

4-7 Oct 1998

Firstpage

242

Abstract

We investigate the functions of given approximation order L that have the smallest support. Those are shown to be linear combinations of the B-spline of degree L-1 and its L-1 first derivatives. We then show how to find the functions that minimize the asymptotic approximation constant among this finite dimension space; in particular, a tractable induction relation is worked out. Using these functions instead of splines, we observe that the approximation error is dramatically reduced, not only in the limit when the sampling step tends to zero, but also for higher values up to the Shannon rate. Finally, we show that those optimal functions satisfy a scaling equation, although less simple than the usual two-scale difference equation

Keywords

error analysis; function approximation; image sampling; interpolation; optimisation; splines (mathematics); B-spline; Shannon rate; approximation order; asymptotic approximation constant; finite dimension space; image processing; minimum support interpolators; optimal functions; optimum approximation properties; reduced approximation error; sampling step; scaling equation; tractable induction relation; two-scale difference equation; Approximation error; Approximation methods; Equations; Fourier transforms; Kernel; Polynomials; Sampling methods; Spline; Sufficient conditions; Upper bound;

fLanguage

English

Publisher

ieee

Conference_Titel

Image Processing, 1998. ICIP 98. Proceedings. 1998 International Conference on

Conference_Location

Chicago, IL

Print_ISBN

0-8186-8821-1

Type

conf

DOI

10.1109/ICIP.1998.999014

Filename

999014