AbstractWe consider the problem of minimizing the largest generalized eigenvalue of a pair of symmetric matrices, each of which depends affinely on the decision variables. Although this problem may appear specialized, it is in fact quite general, and includes for example all linear, quadratic, and linear fractional programs. Many problems arising in control theory can be cast in this form. The problem is nondifferentiable but quasiconvex, so methods such as Kelley's cutting-plane algorithm or the ellipsoid algorithm of Shor, Nemirovsky, and Yudin are guaranteed to minimize it. In this paper we describe relevant background material and a simple interior-point method that solves such problems more efficiently. The algorithm is a variation on ...
Abstract. The feasibility problem for a system of linear inequalities can be converted into an uncon...
The problem of finding the global minimum of a so-called Minkowski-norm dominated polynomial can be ...
The feasibility problem for a system of linear inequalities can be converted into an unconstrained o...
AbstractWe consider the problem of minimizing the largest generalized eigenvalue of a pair of symmet...
We develop an interior-point polynomial-time algorithm for a generalized linear-fractional problem. ...
AbstractOptimization involving eigenvalues arise in many engineering problems. We propose a new algo...
This work concerns the global minimization of a prescribed eigenvalue or a weighted sum of prescribe...
This paper concerns with the solution of a special eigenvalue problem for a large sparse symmetric m...
It has been recently reported that minimax eigenvalue problems can be formulated as nonlinear optimi...
AbstractThe problem of finding the global minimum of a so-called Minkowski-norm dominated polynomial...
: In this paper we present a nonsmooth algorithm to minimize the maximum eigenvalue of matrices belo...
The problem of finding the global minimum of a so-called Minkowski-norm dominated polynomial can be ...
We consider a problem in eigenvalue optimization, in particular finding a local minimizer of the spe...
We present a simple numerical method for minimizing the maximum eigenvalues of real-valued symmetric...
We first introduce a constrained minimization formulation for the generalized symmetric eigenvalue p...
Abstract. The feasibility problem for a system of linear inequalities can be converted into an uncon...
The problem of finding the global minimum of a so-called Minkowski-norm dominated polynomial can be ...
The feasibility problem for a system of linear inequalities can be converted into an unconstrained o...
AbstractWe consider the problem of minimizing the largest generalized eigenvalue of a pair of symmet...
We develop an interior-point polynomial-time algorithm for a generalized linear-fractional problem. ...
AbstractOptimization involving eigenvalues arise in many engineering problems. We propose a new algo...
This work concerns the global minimization of a prescribed eigenvalue or a weighted sum of prescribe...
This paper concerns with the solution of a special eigenvalue problem for a large sparse symmetric m...
It has been recently reported that minimax eigenvalue problems can be formulated as nonlinear optimi...
AbstractThe problem of finding the global minimum of a so-called Minkowski-norm dominated polynomial...
: In this paper we present a nonsmooth algorithm to minimize the maximum eigenvalue of matrices belo...
The problem of finding the global minimum of a so-called Minkowski-norm dominated polynomial can be ...
We consider a problem in eigenvalue optimization, in particular finding a local minimizer of the spe...
We present a simple numerical method for minimizing the maximum eigenvalues of real-valued symmetric...
We first introduce a constrained minimization formulation for the generalized symmetric eigenvalue p...
Abstract. The feasibility problem for a system of linear inequalities can be converted into an uncon...
The problem of finding the global minimum of a so-called Minkowski-norm dominated polynomial can be ...
The feasibility problem for a system of linear inequalities can be converted into an unconstrained o...