Frames, Irregular Sampling, and a Wavelet Auditory Model

Abstract: 14A Wavelet Auditory Model (WAM) is constructed in tenns of wavelet frames and an irregular sampling algorithm for Fourier frames. Its theoretical effectiveness is demonstrated in the context of speech coding, and its original fonnulation is found in [8][9]. The presentation of WAM in this chapter emphasizes its underlying mathematical ideas, and, in particular, develops the notions from the theory of frames and irregular sampling that arise naturally in constructing WAM. IntroductionWe shall develop some of t… Show more

“…The sampling and reconstruction problem includes devising efficient methods for representing a signal (function) in terms of a discrete (finite or countable) set of its samples (values) and reconstructing the original signal from the samples (see e.g., [1,3,8,9,17,22] and the reference therein). In this paper we consider a very general sampling model where the signal is assumed to belong to a finitely generated shift invariant space and the sampling is performed on an irregular separated set and is averaged by finite Borel measures.…”

On stability of sampling-reconstruction models

“…The sampling and reconstruction problem includes devising efficient methods for representing a signal (function) in terms of a discrete (finite or countable) set of its samples (values) and reconstructing the original signal from the samples (see e.g., [1,3,8,9,17,22] and the reference therein). In this paper we consider a very general sampling model where the signal is assumed to belong to a finitely generated shift invariant space and the sampling is performed on an irregular separated set and is averaged by finite Borel measures.…”

On stability of sampling-reconstruction models

Periodic Nonuniform Sampling in Shift-Invariant Spaces

Acceleration of the frame algorithm