Title :
Optimal windowing for wideband linear arrays
Author :
De Villiers, Geoffrey D.
Author_Institution :
QinetiQ Ltd., Worcs
fDate :
7/1/2006 12:00:00 AM
Abstract :
The problem of constructing a wideband beam pattern that is concentrated in both angle and frequency is discussed. This paper is a direct extension of the work of Slepian and co-workers on time- and frequency-limited functions. It is shown that the singular vectors and singular functions of the mapping relating the set of weights of a linear wideband array to its far-field directivity pattern have both concentration properties and double orthogonality properties and so they can be thought of as the wideband equivalents of the discrete prolate spheroidal sequences and wave functions. These singular functions are used to obtain approximations to a frequency-invariant beam pattern
Keywords :
array signal processing; singular value decomposition; Slepian works; concentration properties; discrete prolate spheroidal sequences; double orthogonality properties; far-field directivity pattern; frequency-invariant beam pattern; frequency-limited functions; optimal windowing; singular value decomposition; time-limited functions; wave functions; wideband beam pattern; wideband equivalents; wideband linear arrays; Array signal processing; Delay lines; Frequency; Helium; Narrowband; Singular value decomposition; Size control; Vectors; Wave functions; Wideband; Double orthogonality; optimal windows; singular value decomposition (SVD); wideband arrays;
Journal_Title :
Signal Processing, IEEE Transactions on
DOI :
10.1109/TSP.2006.874287
