Title :
On minimizing the largest eigenvalue of a symmetric matrix
Author :
Fan, Michael K H ; Nekooie, Batool
Author_Institution :
Sch. of Electr. Eng., Georgia Inst. of Technol., Atlanta, GA, USA
Abstract :
The problem of minimizing the largest eigenvalue over an affine family of symmetric matrices is considered. This problem has a variety of applications, such as the stability analysis of dynamic systems or the computation of structured singular values. Given ∈⩾0, an optimality condition is given which ensures that the largest eigenvalue is within ∈ error bound of the solution. A novel line search rule is proposed and shown to have good descent property. When the multiplicity of the largest eigenvalue at solution is known, a novel algorithm for the optimization problem under consideration is derived. Numerical experiments show that the algorithm has good convergence behavior
Keywords :
control system analysis; convergence of numerical methods; eigenvalues and eigenfunctions; matrix algebra; stability; affine family; convergence behavior; descent property; dynamic systems; eigenvalue; error bound; line search rule; optimality condition; stability analysis; structured singular values; symmetric matrix; Convergence of numerical methods; Eigenvalues and eigenfunctions; Equations; Optimization methods; Stability analysis; Sufficient conditions; Symmetric matrices;
Conference_Titel :
Decision and Control, 1992., Proceedings of the 31st IEEE Conference on
Conference_Location :
Tucson, AZ
Print_ISBN :
0-7803-0872-7
DOI :
10.1109/CDC.1992.371775
