We study the fundamental problem of nonnegative least squares. This problem was apparently introduced by Lawson and Hanson [1] under the name NNLS. As is evident from its name, NNLS seeks least-squares solutions that are also nonnegative. Owing to its wide-applicability numerous algorithms have been derived for NNLS, beginning from the active-set approach of Lawson and Han- son [1] leading up to the sophisticated interior-point method of Bellavia et al. [2]. We present a new algorithm for NNLS that combines projected subgradients with the non-monotonic gradient descent idea of Barzilai and Borwein [3]. Our resulting algorithm is called BBSG, and we guarantee its convergence by ex- ploiting properties of NNLS in conjunction with projected su...
Nonnegative matrix approximation (NNMA) is a popular matrix decomposition technique that has proven ...
In many applications, solutions of numerical problems are required to be non-negative, e.g., when re...
We describe how to maintain an explicit sparse orthogonal factorization in order to solve the sequen...
We study the fundamental problem of nonnegative least squares. This problem was apparently introduce...
We study the fundamental problem of nonnegative least squares. This problem was apparently introduce...
We present an efficient algorithm for large-scale non-negative least-squares (NNLS). We solve NNLS b...
Abstract The Nonnegative Least Squares (NNLS) formulation arises in many important regression proble...
Constrained least squares estimation lies at the heart of many applications in fields as diverse as ...
In this work, we propose sequential non-negative least squares (S-NNLS), an efficient algorithm for ...
International audienceThe k-sparse nonnegative least squares (NNLS) problem is a variant of the stan...
This document reviews the nonnegative least square (NNLS) optimisation problem and the usage of the ...
We study the sparse non-negative least squares (S-NNLS) problem. S-NNLS occurs naturally in a wide v...
An explicit sparse orthogonal factorization is maintained in order to solve the se-quence of sparse ...
algorithm for non-negative least squares (NNLS). Also allows the combination of non-negative and non...
We discuss a new simple method to solve linear programming (LP) problems, based on the so called dua...
Nonnegative matrix approximation (NNMA) is a popular matrix decomposition technique that has proven ...
In many applications, solutions of numerical problems are required to be non-negative, e.g., when re...
We describe how to maintain an explicit sparse orthogonal factorization in order to solve the sequen...
We study the fundamental problem of nonnegative least squares. This problem was apparently introduce...
We study the fundamental problem of nonnegative least squares. This problem was apparently introduce...
We present an efficient algorithm for large-scale non-negative least-squares (NNLS). We solve NNLS b...
Abstract The Nonnegative Least Squares (NNLS) formulation arises in many important regression proble...
Constrained least squares estimation lies at the heart of many applications in fields as diverse as ...
In this work, we propose sequential non-negative least squares (S-NNLS), an efficient algorithm for ...
International audienceThe k-sparse nonnegative least squares (NNLS) problem is a variant of the stan...
This document reviews the nonnegative least square (NNLS) optimisation problem and the usage of the ...
We study the sparse non-negative least squares (S-NNLS) problem. S-NNLS occurs naturally in a wide v...
An explicit sparse orthogonal factorization is maintained in order to solve the se-quence of sparse ...
algorithm for non-negative least squares (NNLS). Also allows the combination of non-negative and non...
We discuss a new simple method to solve linear programming (LP) problems, based on the so called dua...
Nonnegative matrix approximation (NNMA) is a popular matrix decomposition technique that has proven ...
In many applications, solutions of numerical problems are required to be non-negative, e.g., when re...
We describe how to maintain an explicit sparse orthogonal factorization in order to solve the sequen...