Non-linear optimization technique for partial solution of generalized eigenvalue problems

Structural stability problems under displacement-dependent loads often take the form of non-linear eigenvalue problems in which the eigenvalue is raised to an exponent. Iterative techniques are considered in this work for the solution of non-linear eigenproblems of the form ( K -MI -K2(XP))x=0. The

In this article we discuss a method for the solution of non-separable eigenvalue problems. These problems are taken to be elliptic and linear and arise in a whole host of physically interesting problems. The approach exploits finite differences and a pseudo-spectral scheme. We elect to normalise at

Many optimization problems in engineering require coupling a mathematical programming process to a numerical simulation. When the latter is non-linear, the resulting computer time may become una ordably large because three sequential procedures are nested: the outer loop is associated to the optimiz

Based on Davidson method for solving generalized eigenvalue problems, a new method for synchro calculation of eigenpairs and their partial derivatives of generalized eigenvalue problems is presented. Eigenpairs and their partial derivatives are computed simultaneously. The equation systems that are

## Abstract This paper presents an efficient solution for solving the generalized eigenvalue equation arising in the finite‐element (FE) formulation of propagation characterization of planar transmission‐line structures. A two‐dimensional (2‐D) finite‐element method (FEM) is used for analyzing the