Add to ORKGA novel procedure is given here for constructing non-negative functions with zero-valued global minima coinciding with eigenvectors of a general real matrix A. Some of these functions are distinct because all their local minima are also global, offering a new way of determining eigenpairs by local optimization. Apart from describing the framework of the method, the error bounds given separately for the approximation of eigenvectors and eigenvalues provide a deeper insight into the fundamentally different nature of their approximations
Abstract. In this paper, we consider smooth convex approximations to the maximum eigenvalue function...
In this paper we study eigenvalue optimization of non-commutative polynomials. That is, we compute t...
In this paper we study eigenvalue optimization of non-commutative polynomials. That is, we compute t...
This work concerns the global minimization of a prescribed eigenvalue or a weighted sum of prescribe...
In this work, we interpret real symmetric eigenvalue problems in an unconstrained global optimizatio...
This work concerns the global minimization of a prescribed eigenvalue or a weighted sum of prescribe...
In this work, we interpret real symmetric eigenvalue problems in an unconstrained global optimizatio...
This work concerns the global minimization of a prescribed eigenvalue or a weighted sum of prescribe...
The unordered eigenvalues of a Hermitian matrix function depending on one parameter analytically is ...
We consider a problem in eigenvalue optimization, in particular finding a local minimizer of the spe...
It has been recently reported that minimax eigenvalue problems can be formulated as nonlinear optimi...
Optimization of convex functions subject to eigenvalue constraints is intriguing because of peculiar...
AbstractMany multivariate statistical procedures, such as principal component, canonical correlation...
In this paper, we consider smooth convex approximations to the maximum eigenvalue function. To make ...
Abstract. In this paper, we consider smooth convex approximations to the maximum eigenvalue function...
Abstract. In this paper, we consider smooth convex approximations to the maximum eigenvalue function...
In this paper we study eigenvalue optimization of non-commutative polynomials. That is, we compute t...
In this paper we study eigenvalue optimization of non-commutative polynomials. That is, we compute t...
This work concerns the global minimization of a prescribed eigenvalue or a weighted sum of prescribe...
In this work, we interpret real symmetric eigenvalue problems in an unconstrained global optimizatio...
This work concerns the global minimization of a prescribed eigenvalue or a weighted sum of prescribe...
In this work, we interpret real symmetric eigenvalue problems in an unconstrained global optimizatio...
This work concerns the global minimization of a prescribed eigenvalue or a weighted sum of prescribe...
The unordered eigenvalues of a Hermitian matrix function depending on one parameter analytically is ...
We consider a problem in eigenvalue optimization, in particular finding a local minimizer of the spe...
It has been recently reported that minimax eigenvalue problems can be formulated as nonlinear optimi...
Optimization of convex functions subject to eigenvalue constraints is intriguing because of peculiar...
AbstractMany multivariate statistical procedures, such as principal component, canonical correlation...
In this paper, we consider smooth convex approximations to the maximum eigenvalue function. To make ...
Abstract. In this paper, we consider smooth convex approximations to the maximum eigenvalue function...
Abstract. In this paper, we consider smooth convex approximations to the maximum eigenvalue function...
In this paper we study eigenvalue optimization of non-commutative polynomials. That is, we compute t...
In this paper we study eigenvalue optimization of non-commutative polynomials. That is, we compute t...