Title :
Green´s function-based wavelets: Selected properties
Author :
Baghai-Wadji, A.R. ; Walter, G.G.
Author_Institution :
Lab. of Mater. Phys., Helsinki Univ. of Technol., Espoo, Finland
Abstract :
In this paper we prove the orthogonality of the wavelet functions constructed from the Laplace operator. Using Plancherel´s theorem the orthogonality is shown in the wavenumber domain rather than in the real space. The presented analysis is semi-rigorous, since the involved ln|x| function is not in L2(R). The wavelet itself is, however, in L2(R). A more comprehensive theory will be presented elsewhere. Furthermore, the existence of a large family of wavelet-like orthogonal systems related to the wavelet of the Laplace operator has been shown
Keywords :
Green´s function methods; wavelet transforms; Green function; Laplace operator; Plancherel theorem; orthogonal system; orthogonality; wavelet function; Industrial electronics; Laboratories; Laplace equations; Materials science and technology; Physics; Wavelet analysis;
Conference_Titel :
Ultrasonics Symposium, 2000 IEEE
Conference_Location :
San Juan
Print_ISBN :
0-7803-6365-5
DOI :
10.1109/ULTSYM.2000.922539
