We consider the MDS problem of fitting an lp-distance matrix to a given dissimilarity matrix with respect to the weighted least squares loss function (STRESS). The problem is reduced to the maximization of a ratio of two norms on a finite dimensional Hilbert space. A necessary condition for a point where a local maximum is attained constitutes a nonlinear eigenproblem in terms of subgradients. Explicit expressions for the subgradients of both norms are derived, a new iterative procedure for solving the nonlinear eigenproblem is proposed, and its global convergence is proved for p [set membership, variant] [1, 2].
Abstract. Given a square matrix A, the inverse subspace problem is concerned with determining a clos...
This work concerns the global minimization of a prescribed eigenvalue or a weighted sum of prescribe...
This paper considers the problem of determining the minimum Euclidean distance of a point from a pol...
AbstractWe consider the MDS problem of fitting an lp-distance matrix to a given dissimilarity matrix...
AbstractThis paper proposes an algorithm for matrix minimum-distance projection, with respect to a m...
The additive constant problem has a long history in multi-dimensional scaling and it has recently be...
Abstract. The additive constant problem has a long history in multi-dimensional scaling and it has r...
Click on the DOI link below to access the article (may not be free).This paper proposes an algorithm...
In this paper, we consider smooth convex approximations to the maximum eigenvalue function. To make ...
The aim of the paper is to present a new global optimization method for determining all the optima ...
The current paper studies the problem of minimizing a loss f(x) subject to constraints of the form D...
In this paper, a new method for the estimation of the fundamental matrix from point correspondences ...
We propose a novel framework for the deterministic construction of linear, near-isometric embeddings...
Given a square matrix A, the inverse subspace problem is concerned with determining a closest matrix...
Abstract. In this paper, we consider smooth convex approximations to the maximum eigenvalue function...
Abstract. Given a square matrix A, the inverse subspace problem is concerned with determining a clos...
This work concerns the global minimization of a prescribed eigenvalue or a weighted sum of prescribe...
This paper considers the problem of determining the minimum Euclidean distance of a point from a pol...
AbstractWe consider the MDS problem of fitting an lp-distance matrix to a given dissimilarity matrix...
AbstractThis paper proposes an algorithm for matrix minimum-distance projection, with respect to a m...
The additive constant problem has a long history in multi-dimensional scaling and it has recently be...
Abstract. The additive constant problem has a long history in multi-dimensional scaling and it has r...
Click on the DOI link below to access the article (may not be free).This paper proposes an algorithm...
In this paper, we consider smooth convex approximations to the maximum eigenvalue function. To make ...
The aim of the paper is to present a new global optimization method for determining all the optima ...
The current paper studies the problem of minimizing a loss f(x) subject to constraints of the form D...
In this paper, a new method for the estimation of the fundamental matrix from point correspondences ...
We propose a novel framework for the deterministic construction of linear, near-isometric embeddings...
Given a square matrix A, the inverse subspace problem is concerned with determining a closest matrix...
Abstract. In this paper, we consider smooth convex approximations to the maximum eigenvalue function...
Abstract. Given a square matrix A, the inverse subspace problem is concerned with determining a clos...
This work concerns the global minimization of a prescribed eigenvalue or a weighted sum of prescribe...
This paper considers the problem of determining the minimum Euclidean distance of a point from a pol...