Title :
The power classes of quadratic time-frequency representations: a generalization of the affine and hyperbolic classes
Author :
Hlawatsch, Frans ; Papandreou, A. ; Boudreaux-Bartels, G. Faye
Author_Institution :
Inst. fur Nachrichtentech. und Hochfrequenztech., Tech. Univ. Wien, Austria
Abstract :
The affine and hyperbolic classes of quadratic time-frequency representations (QTFRs) are frameworks for multiresolution or constant-Q time-frequency analysis. This paper generalizes the affine and hyperbolic QTFR classes by introducing the power classes (PCs) which comprise all QTFRs that are scale-covariant and covariant to power-law time shifts. The affine and hyperbolic classes are special cases of the PCs. We show that the PCs can be obtained from the affine class through a “power warping” mapping. We discuss signal transformations related to the PCs, the description of the PCs by kernel functions, desirable properties and kernel constraints, and specific PC members
Keywords :
signal processing; time-frequency analysis; affine classes; constant-Q time-frequency analysis; hyperbolic classes; kernel constraints; kernel functions; multiresolution time-frequency analysis; power classes; power warping; power-law time shifts; quadratic time-frequency representations; scale-covariant; signal transformations; time-varying signal analysis; Bandwidth; Delay effects; Dispersion; Kernel; Personal communication networks; Signal analysis; Signal resolution; Time frequency analysis; Wavelet analysis; Wavelet transforms;
Conference_Titel :
Signals, Systems and Computers, 1993. 1993 Conference Record of The Twenty-Seventh Asilomar Conference on
Conference_Location :
Pacific Grove, CA
Print_ISBN :
0-8186-4120-7
DOI :
10.1109/ACSSC.1993.342332
