The Papoulis-Gerchberg Algorithm with Unknown Signal Bandwidth

Effects of Papoulis-Gerchberg Iterative Scheme with Real Orthogonal Transform for Signal Reconstruction

The iterative algorithm of Papoulis-Gerchberg is simple and efficient solution to signal reconstruction problem. However, the PG algorithm is usually slowly convergent, and a band-limited signal practically is difficult to be obtained. In this work, we present and discuss an innovative approach for restoring lost data with a specific preprocess for meeting boundary conditions of real orthogonal...

Interpolation and the discrete Papoulis-Gerchberg algorithm

Modified Papoulis-Gerchberg algorithm for sparse signal recovery

Motivated by the well-known Papoulis-Gerchberg algorithm, an iterative thresholding algorithm for recovery of sparse signals from few observations is proposed. The sequence of iterates turns out to be similar to that of the thresholded Landweber iterations, although not the same. The performance of the proposed algorithm is experimentally evaluated and compared to other state-of-the-art methods.

Signal Extrapolation in Wavelet Subspaces

Abstract. The Papoulis-Gerchberg (PG) algorithm is well known for band-limited signal extrapolation. The authors consider the generalization of the PG algorithm to signals in the wavelet subspaces in this research. The uniqueness of the extrapolation for continuous-time signals is examined, and sufficient conditions on signals and wavelet bases for the generalized PG (GPG) algorithm to converge...

Ferreira : Interpolation and the Discrete Papoulis - Gerchberg Algorithm

| In this paper we analyze the performance of an iterative algorithm, similar to the discrete Papoulis-Gerchberg algorithm, and which can be used to recover missing samples in nite-length records of band-limited data. No assumptions are made regarding the distribution of the missing samples, in contrast with the often studied extrapolation problem, in which the known samples are grouped togethe...