Title :
Time-limited signals and Gabor expansion
Author :
Brodzik, Andy ; Conner, Michael
Author_Institution :
Large Syst. Comput. Div., IBM Corp., Poughkeepsie, NY, USA
Abstract :
Gabor (1946) expansion suffers from the consequences of the zero theorem which states that all continuous functions have a zero on the unit square in the Zak space. In particular the Gaussian function routinely selected for a window in the Gaborian analysis has a zero at (1/2,1/2). As a result a zero-matching scheme between the signal and the window must be employed, which limits the class of signals that can be analyzed. We demonstrate that for a broad class of signals existence of zero of the window does not affect stability of the Gabor expansion and the zero-matching procedure can be avoided. It is shown that signal time-limited to the (-1/2,1/2) interval must have a zero at (1/2,1/2) in the Zak space, thus allowing a legal Gabor expansion based on a Gaussian window
Keywords :
Gaussian processes; functions; signal representation; Gabor expansion; Gaussian function; Gaussian window; Zak space; continuous functions; signal analysis; signal representation; time-limited signals; unit square; zero theorem; zero-matching scheme; Convergence; Frequency synthesizers; Law; Legal factors; Signal analysis; Signal processing; Signal synthesis; Stability; Zirconium;
Conference_Titel :
Time-Frequency and Time-Scale Analysis, 1994., Proceedings of the IEEE-SP International Symposium on
Conference_Location :
Philadelphia, PA
Print_ISBN :
0-7803-2127-8
DOI :
10.1109/TFSA.1994.467242
