This paper analyzes linear least squares problems with absolute quadratic constraints. We develop a generalized theory following Bookstein's conic-fitting and Fitzgibbon's direct ellipse-specific fitting. Under simple preconditions, it can be shown that a minimum always exists and can be determined by a generalized eigenvalue problem. This problem is numerically reduced to an eigenvalue problem by multiplications of Givens' rotations. Finally, four applications of this approach are presented
This paper describes a method of minimizing a strictly convex quadratic functional of several variab...
The paper describes a numerically stable algorithm to solve constrained linear least-squares problem...
AbstractWe derive an explicit determinantal formula for the least squares solution of an overdetermi...
AbstractLinear least squares problems with box constraints are commonly solved to find model paramet...
Abstract. The generalized linear least squares problem is treated here as a linear least squares pro...
The equality constrained indefinite least squares problem involves the minimization of an indefinite...
The problem of solving approximately in the least squares sense an overdetermined linear system of e...
Abstract. An inverse eigenvalue problem, where a matrix is to be constructed from some or all of its...
We present some perturbation results for least squares problems with equality constraints. Relative ...
We present some new results on the perturbation analysis for least squares problems with equality co...
International audienceWith the help of elementary results and techniques from Real Analysis and Opti...
The weighting method for solving a least squares problem with linear equality constraints multiplies...
Linear least squares problems with box constraints are commonly solved to find model parameters with...
A backward error analysis of the direct elimination method for linear equality constrained least squ...
AbstractWe present some new results on the perturbation analysis for least squares problems with equ...
This paper describes a method of minimizing a strictly convex quadratic functional of several variab...
The paper describes a numerically stable algorithm to solve constrained linear least-squares problem...
AbstractWe derive an explicit determinantal formula for the least squares solution of an overdetermi...
AbstractLinear least squares problems with box constraints are commonly solved to find model paramet...
Abstract. The generalized linear least squares problem is treated here as a linear least squares pro...
The equality constrained indefinite least squares problem involves the minimization of an indefinite...
The problem of solving approximately in the least squares sense an overdetermined linear system of e...
Abstract. An inverse eigenvalue problem, where a matrix is to be constructed from some or all of its...
We present some perturbation results for least squares problems with equality constraints. Relative ...
We present some new results on the perturbation analysis for least squares problems with equality co...
International audienceWith the help of elementary results and techniques from Real Analysis and Opti...
The weighting method for solving a least squares problem with linear equality constraints multiplies...
Linear least squares problems with box constraints are commonly solved to find model parameters with...
A backward error analysis of the direct elimination method for linear equality constrained least squ...
AbstractWe present some new results on the perturbation analysis for least squares problems with equ...
This paper describes a method of minimizing a strictly convex quadratic functional of several variab...
The paper describes a numerically stable algorithm to solve constrained linear least-squares problem...
AbstractWe derive an explicit determinantal formula for the least squares solution of an overdetermi...