Title :
Class-dependent, discrete time-frequency distributions via operator theory
Author :
McLaughlin, Jack ; Droppo, James ; Atlas, Les
Author_Institution :
Dept. of Electr. Eng., Washington Univ., Seattle, WA, USA
Abstract :
We propose a property for kernel design which results in distributions for each of two classes of signals which maximally separates their energies in the time-frequency plane. Such maximally separated distributions may result in improved classification because the signal representation is optimized to accentuate the differences in signal classes. This is not the case with other time-frequency kernels which are optimized based upon some criteria unrelated to the classification task. Using our operator theory formulation for time-frequency representations, our “maximal separation” criteria takes on a very easily solved form. Analysis of the solution in both the time-frequency and ambiguity planes is given along with an example on discrete signals
Keywords :
discrete systems; mathematical operators; signal representation; statistical analysis; time-frequency analysis; ambiguity plane; class dependent distributions; classification; discrete signals; discrete time-frequency distributions; kernel design; maximally separated distributions; operator theory; signal classes; signal energies; signal representation; time-frequency kernels; time-frequency plane; time-frequency representations; Continuous wavelet transforms; Discrete wavelet transforms; Interactive systems; Kernel; Laboratories; Lifting equipment; Signal analysis; Signal design; Signal representations; Time frequency analysis;
Conference_Titel :
Acoustics, Speech, and Signal Processing, 1997. ICASSP-97., 1997 IEEE International Conference on
Conference_Location :
Munich
Print_ISBN :
0-8186-7919-0
DOI :
10.1109/ICASSP.1997.599347
