The affine inverse eigenvalue problem consists of identifying a real symmetric matrix with a prescribed set of eigenvalues in an affine space. Due to its ubiquity in applications, various instances of the problem have been widely studied in the literature. Previous algorithmic solutions were typically nonconvex heuristics and were often developed in a case-by-case manner for specific structured affine spaces. In this short note we describe a general family of convex relaxations for the problem by reformulating it as a question of checking feasibility of a system of polynomial equations, and then leveraging tools from the optimization literature to obtain semidefinite programming relaxations. Our system of polynomial equations may be viewed ...
The computation of eigenvalues of a matrix is still of importance from both theoretical and practica...
AbstractThe quadratic inverse eigenvalue problem (QIEP) is to find the three matrices M,C, and K, gi...
In this paper, we consider smooth convex approximations to the maximum eigenvalue function. To make ...
The affine inverse eigenvalue problem consists of identifying a real symmetric matrix with a prescri...
It has been recently reported that minimax eigenvalue problems can be formulated as nonlinear optimi...
This thesis is concerned with presenting convex optimization based tractable solutions for three fun...
Affine inverse eigenvalue problems are usually solved using iterations where the object is to dimini...
AbstractThe classical inverse additive and multiplicative inverse eigenvalue problems for matrices a...
AbstractA numerical algorithm for the inverse eigenvalue problem for symmetric matrices is developed...
Abstract. A collection of inverse eigenvalue problems are identi ed and classi ed according to their...
A theorem about the bounds of solutions of the Toeplitz Inverse Eigenvalue Problem is introduced and...
Abstract. Optimization problems involving the eigenvalues of symmetric and nonsymmetric matrices pre...
AbstractThe paper ios concerned with the problem of finding a real, diagonal matrix M such that A + ...
AbstractThe inverse eigenvalue problem for real symmetric matrices of the form000⋯00∗000⋯0∗∗000⋯∗∗0·...
Most applications of the inverse eigenvalue problem (IEP), which concerns the reconstruction of a ma...
The computation of eigenvalues of a matrix is still of importance from both theoretical and practica...
AbstractThe quadratic inverse eigenvalue problem (QIEP) is to find the three matrices M,C, and K, gi...
In this paper, we consider smooth convex approximations to the maximum eigenvalue function. To make ...
The affine inverse eigenvalue problem consists of identifying a real symmetric matrix with a prescri...
It has been recently reported that minimax eigenvalue problems can be formulated as nonlinear optimi...
This thesis is concerned with presenting convex optimization based tractable solutions for three fun...
Affine inverse eigenvalue problems are usually solved using iterations where the object is to dimini...
AbstractThe classical inverse additive and multiplicative inverse eigenvalue problems for matrices a...
AbstractA numerical algorithm for the inverse eigenvalue problem for symmetric matrices is developed...
Abstract. A collection of inverse eigenvalue problems are identi ed and classi ed according to their...
A theorem about the bounds of solutions of the Toeplitz Inverse Eigenvalue Problem is introduced and...
Abstract. Optimization problems involving the eigenvalues of symmetric and nonsymmetric matrices pre...
AbstractThe paper ios concerned with the problem of finding a real, diagonal matrix M such that A + ...
AbstractThe inverse eigenvalue problem for real symmetric matrices of the form000⋯00∗000⋯0∗∗000⋯∗∗0·...
Most applications of the inverse eigenvalue problem (IEP), which concerns the reconstruction of a ma...
The computation of eigenvalues of a matrix is still of importance from both theoretical and practica...
AbstractThe quadratic inverse eigenvalue problem (QIEP) is to find the three matrices M,C, and K, gi...
In this paper, we consider smooth convex approximations to the maximum eigenvalue function. To make ...