Title :
Irregular sampling theorems for wavelet subspaces
Author :
Chen, Wen ; Itoh, Shuichi ; Shiki, Junji
Author_Institution :
Dept. of Inf. Network Sci., Univ. of Electro-Commun., Tokyo, Japan
fDate :
5/1/1998 12:00:00 AM
Abstract :
From the Paley-Wiener 1/4-theorem, the finite energy signal f(t) can be reconstructed from its irregularly sampled values f(k+δκ) if f(t) is band-limited and supκ|δκ|<1/4. We consider the signals in wavelet subspaces and wish to recover the signals from its irregular samples by using scaling functions. Then the method of estimating the upper bound of supκ|δκ | such that the irregularly sampled signals can be recovered is very important. Following the work done by Liu and Walter (see J. Fourier Anal. Appl., vol.2, no.2, p.181-9, 1995), we present an algorithm which can estimate a proper upper bound of supκ |δκ|. Compared to Paley-Wiener 1/4-theorem, this theorem can relax the upper bound for sampling in some wavelet subspaces
Keywords :
parameter estimation; signal reconstruction; signal sampling; wavelet transforms; Paley-Wiener 1/4-theorem; band-limited signal; finite energy signal; irregular sampling theorems; irregularly sampled signals; scaling functions; signal reconstruction; signal recovery; upper bound estimation; wavelet subspaces; Fourier transforms; Information systems; Information theory; Iterative algorithms; Multiresolution analysis; Sampling methods; Spline; Subspace constraints; Upper bound; Wavelet analysis;
Journal_Title :
Information Theory, IEEE Transactions on
