A modified multiple OLS (m2OLS) algorithm for signal recovery in compressive sensing

Abstract: Orthogonal least square (OLS) is an important sparse signal recovery algorithm in compressive sensing, which enjoys superior probability of success over other well known recovery algorithms under conditions of correlated measurement matrices. Multiple OLS (mOLS) is a recently proposed improved version of OLS which selects multiple candidates per iteration by generalizing the greedy selection principle used in OLS and enjoys faster convergence than OLS. In this paper, we present a refined version of the mOLS al… Show more

“…Wen et al [19] and Geng et al [20] utilized the restricted isometry property (RIP), which is defined as follows, to study the sufficient condition of exact recovery of x with OLS. Using the RIP, the authors in [21][22][23][24] discussed the performance of multiple OLS which is an extension of OLS.…”

Required Number of Iterations for Sparse Signal Recovery via Orthogonal Least Squares

“…Wen et al [19] and Geng et al [20] utilized the restricted isometry property (RIP), which is defined as follows, to study the sufficient condition of exact recovery of x with OLS. Using the RIP, the authors in [21][22][23][24] discussed the performance of multiple OLS which is an extension of OLS.…”

Required Number of Iterations for Sparse Signal Recovery via Orthogonal Least Squares

“…如 A*OMP [16] 、广义协 方差匹配追踪 (generalized covariance-assisted matching pursuit) [17] 和广义正交匹配追踪 (generalized OMP, gOMP) [18][19][20][21] 等. 最近, 在 mOLS 算法基础上, Mukhopadhyay 等 [22] [22] 算法 输入:…”

Analysis of the modified multiple OLS (mbm$^2$OLS) algorithm for sparse signal recovery with noise