# YALL1-Group: A solver for group/joint sparse reconstruction

(Difference between revisions)
 Revision as of 15:11, 29 May 2014 (edit)← Previous diff Revision as of 22:09, 20 August 2014 (edit) (undo)m (Reverted edits by Wei Deng (Talk); changed back to last version by Dattorro)Next diff → Line 1: Line 1: - YALL1-Group is a MATLAB software package for group/joint sparse reconstruction, written by [http://dengwei.blogs.rice.edu Wei Deng], [http://www.caam.rice.edu/~wy1/google_site/www.wotaoyin.com/ Wotao Yin] and [http://www.caam.rice.edu/~zhang/ Yin Zhang] at Rice University. [http://yall1.blogs.rice.edu/ Download] + YALL1-Group is a MATLAB software package for group/joint sparse reconstruction, written by Wei Deng, [http://www.caam.rice.edu/~wy1/google_site/www.wotaoyin.com/ Wotao Yin] and [http://www.caam.rice.edu/~zhang/ Yin Zhang] at Rice University. [http://yall1.blogs.rice.edu/ Download] ---- ---- Line 8: Line 8: == Model == == Model == - $\ell_{2,1}$-based minimizatoin is one of the approaches for group or joint sparse reconstruction. + The following weighted $\ell_{2,1}$-regularization is known to facilitate group/joint sparsity in the solution. - *YALL1-Group solves models (1) and (2), and its future versions will support extensions of (1) and (2). + (1) Group-sparse basis pursuit model with or without nonnegativity constraint: (1) Group-sparse basis pursuit model with or without nonnegativity constraint: Line 17: Line 16: $x\geq0$ (optional) $x\geq0$ (optional) - where + where $A\in \mathbb{R}^{m\times n}\,(m\,1)$ if $\|R\|_2 > \alpha\|Rp\|_2$, where 0< $\alpha$ <1 is a parameter, $R$ and $Rp$ denote the constraint violations at the current and previous iterations, respectively. Continuation allows small initial penalty parameters for + constraint violations, which lead to faster initial convergence, and it increases those parameters whenever the violation reduction slows down. It leads to overall speedups in most cases. + |- + | ''''ContParameter'''' || scalar between 0 and 1 || The parameter $\alpha$ (0 < $\alpha$ <1) in the continuation scheme. + |- + | ''''ContFactor'''' || scalar greater than 1 || The factor $c\,(c\,>\,1)$ in the continuation scheme. + |} + *'''Note''': the parameter names are not case-sensitive. + + == Output Arguments == + *'''x''': last iterate (hopefully an approximate solution). + *'''Out''': a structure with fields: + **Out.status—exit information; + **Out.iter—number of iterations taken; + **Out.cputime—solver CPU time. + + == Examples == + Please see the demo files. == Technical Report == == Technical Report == The description and theory of the YALL1-Group algorithm can be found in The description and theory of the YALL1-Group algorithm can be found in *Wei Deng, Wotao Yin, and Yin Zhang, [http://www.caam.rice.edu/~optimization/L1/GroupSparsity/group110419.pdf Group Sparse Optimization by Alternating Direction Method]. (TR11-06, Department of Computational and Applied Mathematics, Rice University, 2011) *Wei Deng, Wotao Yin, and Yin Zhang, [http://www.caam.rice.edu/~optimization/L1/GroupSparsity/group110419.pdf Group Sparse Optimization by Alternating Direction Method]. (TR11-06, Department of Computational and Applied Mathematics, Rice University, 2011)

## Revision as of 22:09, 20 August 2014

YALL1-Group is a MATLAB software package for group/joint sparse reconstruction, written by Wei Deng, Wotao Yin and Yin Zhang at Rice University. Download

## Introduction

In the last few years, finding sparse solutions to underdetermined linear systems has become an active research topic, particularly in the area of compressive sensing, statistics and machine learning. Sparsity allows us to reconstruct high dimensional data with only a small number of samples. In order to further enhance the recoverability, recent studies propose to go beyond sparsity and take into account additional information about the underlying structure of the solutions.

In practice, a wide class of solutions are known to have group sparsity structure. Namely, the solution has a natural grouping of its components, and the components within a group are likely to be either all zeros or all nonzeros. Joint sparsity is an interesting special case of the group sparsity structure. Joint sparse solutions consist of multiple sparse solutions that share a common nonzero support. Encoding the group/joint sparsity structure can reduce the degrees of freedom in the solution, thereby leading to better recovery performance.

## Model

The following weighted $LaTeX: \ell_{2,1}$-regularization is known to facilitate group/joint sparsity in the solution.

(1) Group-sparse basis pursuit model with or without nonnegativity constraint:

                  Minimize     $LaTeX: \|x\|_{w,2,1}:=\sum_{i=1}^s w_i\|x_{g_i}\|_2$
subject to   $LaTeX: Ax=b\,$
$LaTeX: x\geq0$ (optional)


where $LaTeX: A\in \mathbb{R}^{m\times n}\,(m, $LaTeX: b\in \mathbb{R}^m$, $LaTeX: g_i$ denotes the index set of the $LaTeX: i$-th group, and $LaTeX: w_i\geq0$ is the weight for the $LaTeX: i$-th group.

(2) Joint-sparse basis pursuit model with or without nonnegativity constraint:

                  Minimize     $LaTeX: \|X\|_{w,2,1}:=\sum_{i=1}^n w_i\|x^i\|_2$
subject to   $LaTeX: AX=B\,$
$LaTeX: X\geq0$ (optional)


where $LaTeX: A\in \mathbb{R}^{m\times n}\,(m, $LaTeX: B\in \mathbb{R}^{m\times l}$, $LaTeX: x^i$ denotes the $LaTeX: i$-th row of matrix $LaTeX: X$, and $LaTeX: w_i\geq0$ is the weight for the $LaTeX: i$-th row.

## Syntax

[x,Out] = YALL1_group(A,b,groups,'param1',value1,'param2',value2,...);

## Input Arguments

• A: an m-by-n matrix with m < n, or a structure with the following fields:
1) A.times (required): a function handle for $LaTeX: A*x$;
2) A.trans (required): a function handle for $LaTeX: A^T*x$;
3) A.invIpAAt: a function handle for $LaTeX: (\beta_1I_m+\beta_2AA^T)^{-1}*x$;
4) A.invAAt: a function handle for $LaTeX: (AA^T)^{-1}*x$.

Note: Field A.invIpAAt is only required when (a) primal solver is to be used, and b) A is non-orthonormal, and (c) exact linear system solving is to be performed. Field A.invAAt is only required when (a) dual solver is to be used, and b) A is non-orthonormal, and (c) exact linear system solving is to be performed.

• b: an m-vector for the group-sparse model or an m-by-l matrix for the joint-sparse model.
• groups: an n-vector containing the group number of the corresponding component of $LaTeX: x$ for the group-sparse model, or [] for the joint-sparse model.
• Optional input arguments:
Parameter Name Value Description
'StopTolerance' positive scalar Stopping tolerance value.
'GrpWeights' nonnegetive n-vector Weights for the groups/rows.
'Nonnegative' true or false True for imposing nonnegativity constraints.
'nonorthA' true or false Specify if matrix A has non-orthonormal rows (true) or orthonormal rows (false).
'ExactLinSolve' true or false Specify if linear systems are to be solve exactly (true) or approximately by taking a gradient descent step (false).
'QuadPenaltyPar' nonnegative 2-vector for primal solver or nonnegative scalar for dual solver Penalty parameters.
'StepLength' nonnegative 2-vector for primal solver or nonnegative scalar for dual solver Step lengths for updating the multipliers.
'maxIter' positive integer Maximum number of iterations allowed.
'xInitial' an n-vector for group-sparse model or an n-by-l matrix for joint-sparse model An initial estimate of the solution.
'Solver' 1 or 2 Specify which solver to use: 1 for primal solver; 2 for dual solver.
'Continuation' true or false Specify if continuation on the penalty parameters is to be used (true) or not (false). The continuation scheme is as follows: multiply the penalty parameters by a factor $LaTeX: c\,(c\,>\,1)$ if $LaTeX: \|R\|_2 > \alpha\|Rp\|_2$, where 0< $LaTeX: \alpha$ <1 is a parameter, $LaTeX: R$ and $LaTeX: Rp$ denote the constraint violations at the current and previous iterations, respectively. Continuation allows small initial penalty parameters for

constraint violations, which lead to faster initial convergence, and it increases those parameters whenever the violation reduction slows down. It leads to overall speedups in most cases.

'ContParameter' scalar between 0 and 1 The parameter $LaTeX: \alpha$ (0 < $LaTeX: \alpha$ <1) in the continuation scheme.
'ContFactor' scalar greater than 1 The factor $LaTeX: c\,(c\,>\,1)$ in the continuation scheme.
• Note: the parameter names are not case-sensitive.

## Output Arguments

• x: last iterate (hopefully an approximate solution).
• Out: a structure with fields:
• Out.status—exit information;
• Out.iter—number of iterations taken;
• Out.cputime—solver CPU time.

## Examples

Please see the demo files.

## Technical Report

The description and theory of the YALL1-Group algorithm can be found in