6533b82efe1ef96bd12929e8

RESEARCH PRODUCT

Locally Supported Wavelets on Manifolds with Applications to the 2D Sphere

Jochen Göttelmann

subject

Sobolev spaceDiscrete wavelet transformWaveletSingularityLegendre waveletMultiresolution analysisApplied MathematicsMathematical analysisFast wavelet transformContinuous wavelet transformMathematics

description

Abstract In this paper we present a construction principle for locally supported wavelets on manifolds once a multiresolution analysis is given. The wavelets provide a stable (or unconditional) basis for a scale of Sobolev spaces H s , 0 ≤ s ≤ s . We examine a fast wavelet transform with almost optimal complexity. For the two-dimensional sphere we construct a multiresolution analysis generated by continuous splines that are bilinear with respect to some special spherical grid. In our approach the poles are not exceptional points concerning the approximation power or the stability of the wavelet basis. Finally we present some numerical applications to singularity detection and the analysis of observed atmospheric data.

yearjournalcountryeditionlanguage
1999-07-01Applied and Computational Harmonic Analysis
10.1006/acha.1999.0259http://dx.doi.org/10.1006/acha.1999.0259