Title :
Quadratic time-frequency distributions: the new hyperbolic class and its intersection with the affine class
Author :
Papandreou, Antonia ; Hlawatsch, Frans ; Boudreaux-Bartels, G.F.
Author_Institution :
Dept. of Electr. Eng., Rhode Island Univ., Kingston, RI, USA
Abstract :
The proposed new class of quadratic time-frequency distributions is based on the `hyperbolic time shift´ and scale invariance properties that are important in the analysis of Doppler invariant signals used in bat and dolphin echolocation, and of `locally self-similar´ signals used in fractals and fractional Brownian motion. The hyperbolic class can be characterized by 2-D kernels, and kernel constraints are derived for some desirable TFD properties. The Bertrand distribution and the Altes distribution are members of the hyperbolic class. The authors define a `localized´ subclass and study the intersection between the affine class and the hyperbolic class
Keywords :
Brownian motion; bioacoustics; fractals; signal processing; time-frequency analysis; Altes distribution; Bertrand distribution; Doppler invariant signals; affine class; echolocation; fractals; fractional Brownian motion; hyperbolic class; intersection; kernel constraints; quadratic time-frequency distributions; scale invariance; Chirp; Delay effects; Dolphins; Fractals; Frequency domain analysis; Kernel; Signal analysis; Time frequency analysis; Wavelet transforms; Wideband;
Conference_Titel :
Statistical Signal and Array Processing, 1992. Conference Proceedings., IEEE Sixth SP Workshop on
Conference_Location :
Victoria, BC
Print_ISBN :
0-7803-0508-6
DOI :
10.1109/SSAP.1992.246840
