We consider the weighted low rank approximation of the positive semidefinite Hankel matrix problem arising in signal processing. By using the Vandermonde representation, we firstly transform the problem into an unconstrained optimization problem and then use the nonlinear conjugate gradient algorithm with the Armijo line search to solve the equivalent unconstrained optimization problem. Numerical examples illustrate that the new method is feasible and effective
Rank deficiency of a data matrix is equivalent to the existence of an exact linear model for the dat...
We introduce a flexible optimization framework for nuclear norm minimization of matrices with linear...
International audienceWe study the problem of decomposing a measured signal as a sum of decaying exp...
This thesis focuses on the weighted and structured low rank approximation problem (wSLRA). This pro...
The problem of finding the nearest positive semidefinite Hankel matrix of a given rank to an arbitra...
This paper investigates the problem of approximating the global minimum of a positive semidefinite H...
AbstractPositive semidefinite Hankel matrices arise in many important applications. Some of their pr...
We study the common problem of approximating a target matrix with a matrix of lower rank. We provi...
Hankel matrices are closely related to linear time-invariant (LTI) models, which are widely used in ...
We study a weighted low-rank approximation that is inspired by a problem of constrained low-rank app...
Abstract. We consider the problem of approximating an affinely structured matrix, for example, a Han...
This thesis is focused on using low rank matrices in numerical mathematics. We introduce conjugate g...
Rank deficiency of a data matrix is equivalent to the existence of an exact linear model for the dat...
Applications of semidefinite optimization in signal processing are often derived from the Kalman–Yaku...
International audienceStructured low-rank approximation is the problem of minimizing a weighted Frob...
Rank deficiency of a data matrix is equivalent to the existence of an exact linear model for the dat...
We introduce a flexible optimization framework for nuclear norm minimization of matrices with linear...
International audienceWe study the problem of decomposing a measured signal as a sum of decaying exp...
This thesis focuses on the weighted and structured low rank approximation problem (wSLRA). This pro...
The problem of finding the nearest positive semidefinite Hankel matrix of a given rank to an arbitra...
This paper investigates the problem of approximating the global minimum of a positive semidefinite H...
AbstractPositive semidefinite Hankel matrices arise in many important applications. Some of their pr...
We study the common problem of approximating a target matrix with a matrix of lower rank. We provi...
Hankel matrices are closely related to linear time-invariant (LTI) models, which are widely used in ...
We study a weighted low-rank approximation that is inspired by a problem of constrained low-rank app...
Abstract. We consider the problem of approximating an affinely structured matrix, for example, a Han...
This thesis is focused on using low rank matrices in numerical mathematics. We introduce conjugate g...
Rank deficiency of a data matrix is equivalent to the existence of an exact linear model for the dat...
Applications of semidefinite optimization in signal processing are often derived from the Kalman–Yaku...
International audienceStructured low-rank approximation is the problem of minimizing a weighted Frob...
Rank deficiency of a data matrix is equivalent to the existence of an exact linear model for the dat...
We introduce a flexible optimization framework for nuclear norm minimization of matrices with linear...
International audienceWe study the problem of decomposing a measured signal as a sum of decaying exp...