Title :
Finite rate of innovation with non-uniform samples
Author :
Wei, Xiaoyao ; Blu, T. ; Dragotti, Pier-Luigi
Author_Institution :
Chinese Univ. of Hong Kong, Hong Kong, China
Abstract :
In this paper, we investigate the problem of retrieving the innovation parameters (time and amplitude) of a stream of Diracs from non-uniform samples taken with a novel kernel (a hyperbolic secant). We devise a non-iterative, exact algorithm that allows perfect reconstruction of 2K innovations from as few as 2K non-uniform samples. We also investigate noise issues and compute the Cramér-Rao lower bounds for this problem. A simple total least-squares extension of the algorithm proves to be efficient in reconstructing the location of a single Dirac from noisy measurements.
Keywords :
least squares approximations; signal reconstruction; signal sampling; 2K innovation reconstruction; 2K nonuniform samples; Cramér-Rao lower bounds; Dirac stream; finite rate; hyperbolic secant; innovation parameter retrieval; least-squares extension; noisy measurements; signal reconstruction; signal sampling; Image reconstruction; Kernel; Mathematical model; Noise measurement; PSNR; Technological innovation; Cramér-Rao Bounds; Signal sampling; finite rate of innovation; hyperbolic secant function; non-uniform;
Conference_Titel :
Signal Processing, Communication and Computing (ICSPCC), 2012 IEEE International Conference on
Conference_Location :
Hong Kong
Print_ISBN :
978-1-4673-2192-1
DOI :
10.1109/ICSPCC.2012.6335674
