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ICASSP
2008
IEEE
2008
IEEE
Sparse reconstruction by separable approximation
Finding sparse approximate solutions to large underdetermined linear systems of equations is a common problem in signal/image processing and statistics. Basis pursuit, the least absolute shrinkage and selection operator (LASSO), wavelet-based deconvolution and reconstruction, and compressed sensing (CS) are a few well-known areas in which problems of this type appear. One standard approach is to minimize an objective function that includes a quadratic (ℓ2) error term added to a sparsity-inducing (usually ℓ1) regularizer. We present an algorithmic framework for the more general problem of minimizing the sum of a smooth convex function and a nonsmooth, possibly nonconvex, sparsity-inducing function. We propose iterative methods in which each step is an optimization subproblem involving a separable quadratic term (diagonal Hessian) plus the original sparsity-inducing term. Our approach is suitable for cases in which this subproblem can be solved much more rapidly than the original pr...
Real-time TrafficICASSP 2008 | Separable Quadratic Term | Signal Processing | Smooth Convex Function | Sparse Approximate Solutions |
| Added | 30 May 2010 |
| Updated | 30 May 2010 |
| Type | Conference |
| Year | 2008 |
| Where | ICASSP |
| Authors | Stephen J. Wright, Robert D. Nowak, Mário A. T. Figueiredo |
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