Title :
On the number of samples needed to identify a mixture of finite alphabet constant modulus sources
Author :
Leshem, Amir ; Van der Veen, Alle-Jan
Author_Institution :
Delft Univ. of Technol., Netherlands
Abstract :
Constant modulus algorithms try to separate linear mixtures of sources with modulus 1. We study the identifiability of this problem: the number of samples needed to ensure that in the noiseless case we have a unique solution. For finite alphabet (L-PSK) sources, finite sample identifiability can hold only with a probability close to but not equal to 1. In a previous paper (Leshem, A. et al., Proc. IEEE Workshop on Sensor Array and Multichannel Signal Processing, 2002), we provided a subexponentially decaying upper bound on the probability of non-identifiability. Here, we provide an improved exponentially decaying upper bound, based on Chernoff bounds. We show that, under practical assumptions, this upper bound is much tighter than previously known bounds.
Keywords :
array signal processing; probability; source separation; Chernoff bounds; exponentially decaying upper bound; finite alphabet constant modulus sources; finite sample identifiability; finite-alphabet sources; sensor arrays; source separation; subexponentially decaying upper bound; Algorithm design and analysis; Binary phase shift keying; Blind equalizers; Cost function; Performance analysis; Phase noise; Sensor arrays; Signal processing; Source separation; Upper bound;
Conference_Titel :
Acoustics, Speech, and Signal Processing, 2003. Proceedings. (ICASSP '03). 2003 IEEE International Conference on
Print_ISBN :
0-7803-7663-3
DOI :
10.1109/ICASSP.2003.1202644
