Paper Info
Title
Time-frequency analysis of signals using support adaptive Hermite-Gaussian expansions
Abstract
Since Hermite-Gaussian (HG) functions provide an orthonormal basis with the most compact time-frequency supports (TFSs), they are ideally suited for time-frequency component analysis of finite energy signals. For a signal component whose TFS tightly fits into a circular region around the origin, HG function expansion provides optimal representation by using the fewest number of basis functions. However, for signal components whose TFS has a non-circular shape away from the origin, straight forward expansions require excessively large number of HGs resulting to noise fitting. Furthermore, for closely spaced signal components with non-circular TFSs, direct application of HG expansion cannot provide reliable estimates to the individual signal components. To alleviate these problems, by using expectation maximization (EM) iterations, we propose a fully automated pre-processing technique which identifies and transforms TFSs of individual signal components to circular regions centered around the origin so that reliable signal estimates for the signal components can be obtained. The HG expansion order for each signal component is determined by using a robust estimation technique. Then, the estimated components are post-processed to transform their TFSs back to their original positions. The proposed technique can be used to analyze signals with overlapping components as long as the overlapped supports of the components have an area smaller than the effective support of a Gaussian atom which has the smallest time-bandwidth product. It is shown that if the area of the overlap region is larger than this threshold, the components cannot be uniquely identified. Obtained results on the synthetic and real signals demonstrate the effectiveness for the proposed time-frequency analysis technique under severe noise cases.
Year
DOI
Venue
2012
10.1016/j.dsp.2012.05.005
Digital Signal Processing
Keywords
Field
DocType
real signal,circular region,hg function expansion,hg expansion,spaced signal component,individual signal component,time-frequency analysis,reliable signal estimate,support adaptive hermite-gaussian expansion,finite energy signal,hg expansion order,signal component,orthonormal basis
Mathematical optimization,Expectation–maximization algorithm,Hermite polynomials,Orthonormal basis,Gaussian,Time–frequency analysis,Basis function,Component analysis,Mathematics
Journal
Volume
Issue
ISSN
22
6
1051-2004
Citations 
PageRank 
References 
4
0.54
22
Authors
2
Name
Order
Citations
PageRank
Y. K. Alp167.34
Orhan Arıkan2192.33