In the existing methods for solving matrix completion, such as singular value thresholding (SVT), soft-impute and fixed point continuation (FPCA) algorithms, it is typically required to repeatedly implement singular value decompositions (SVD) of matrices.When the size of the matrix in question is large, the computational complexity of finding a solution is costly. To reduce this expensive computational complexity, we apply Kronecker products to handle the matrix completion problem. In particular, we propose using Kronecker factorization, which approximates a matrix by the Kronecker product of several matrices of smaller sizes. Weintroduce Kronecker factorization into the soft-impute framework and devise an effective matrix completion algorith...
International audienceKrylov methods such as GMRES are efficient iterative methods to solve large sp...
In this paper, we address the matrix completion problem and propose a novel algorithm based on a smo...
Matrix decompositions play a pivotal role in matrix computation and applications. While general dens...
The matrix-completion problem has attracted a lot of attention, largely as a result of the celebrate...
AbstractThe Kronecker product has a rich and very pleasing algebra that supports a wide range of fas...
International audienceWe consider the matrix completion problem where the aim is to esti-mate a larg...
The date of receipt and acceptance will be inserted by the editor Summary Stewart's recently in...
The decomposition or approximation of a linear operator on a matrix space as a sum of Kronecker prod...
AbstractIn this paper we give a partial solution to the challenge problem posed by Loiseau et al. in...
The date of receipt and acceptance will be inserted by the editor Summary Stewart’s recently introdu...
summary:The matrix pencil completion problem introduced in [J. J. Loiseau, S. Mondié, I. Zaballa, an...
The matrix completion problem (MC) has been approximated by using the nuclear norm relaxation. Some ...
Kronecker product decomposition is often applied in various fields such as particle physics, signal ...
AbstractIn this paper, we give a lower bound guaranteeing exact matrix completion via singular value...
. This paper considers the problem of finding n \Theta n matrices A k and B k that minimize jjT \Ga...
International audienceKrylov methods such as GMRES are efficient iterative methods to solve large sp...
In this paper, we address the matrix completion problem and propose a novel algorithm based on a smo...
Matrix decompositions play a pivotal role in matrix computation and applications. While general dens...
The matrix-completion problem has attracted a lot of attention, largely as a result of the celebrate...
AbstractThe Kronecker product has a rich and very pleasing algebra that supports a wide range of fas...
International audienceWe consider the matrix completion problem where the aim is to esti-mate a larg...
The date of receipt and acceptance will be inserted by the editor Summary Stewart's recently in...
The decomposition or approximation of a linear operator on a matrix space as a sum of Kronecker prod...
AbstractIn this paper we give a partial solution to the challenge problem posed by Loiseau et al. in...
The date of receipt and acceptance will be inserted by the editor Summary Stewart’s recently introdu...
summary:The matrix pencil completion problem introduced in [J. J. Loiseau, S. Mondié, I. Zaballa, an...
The matrix completion problem (MC) has been approximated by using the nuclear norm relaxation. Some ...
Kronecker product decomposition is often applied in various fields such as particle physics, signal ...
AbstractIn this paper, we give a lower bound guaranteeing exact matrix completion via singular value...
. This paper considers the problem of finding n \Theta n matrices A k and B k that minimize jjT \Ga...
International audienceKrylov methods such as GMRES are efficient iterative methods to solve large sp...
In this paper, we address the matrix completion problem and propose a novel algorithm based on a smo...
Matrix decompositions play a pivotal role in matrix computation and applications. While general dens...