Title :
Irregular sampling for spline wavelet subspaces
Author_Institution :
Dept. of Appl. Math., Beijing Polytech. Univ., China
fDate :
3/1/1996 12:00:00 AM
Abstract :
Spline wavelets ψm(t) are important in time-frequency localization due to (i) ψm can be arbitrarily close to the optimal case as m is sufficiently large, (ii) ψm has compact support and simple analytic expression, which lead to effective computation. Although the spline wavelet subspaces are so simple, Walter´s well-known sampling theorem does not hold if the order of spline m is even. Moreover, when irregular sampling is considered in these spaces, it is hard to determine the sampling density, which is a serious problem in applications, in this correspondence, a general sampling theorem is obtained for m⩾3 in the sense of iterative construction and the sampling density δm is estimated
Keywords :
iterative methods; signal sampling; splines (mathematics); time-frequency analysis; wavelet transforms; general sampling theorem; irregular sampling; iterative construction; sampling density; signal analysis; spline wavelet subspaces; time-frequency localization; Iterative algorithms; Lattices; Sampling methods; Signal analysis; Signal processing; Spline; Time frequency analysis; Time varying systems; Wavelet analysis; Wavelet transforms;
Journal_Title :
Information Theory, IEEE Transactions on
