A localization technique for linear preserver problems

## Abstract In this article a local defect correction technique for time‐dependent problems is presented. The method is suitable for solving partial differential equations characterized by a high activity, which is mainly located, at each time, in a small part of the physical domain. The problem is

A numerical model is developed for the simulation of moving interfaces in viscous incompressible flows. The model is based on the finite element method with a pseudo-concentration technique to track the front. Since a Eulerian approach is chosen, the interface is advected by the flow through a fixed

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

## Abstract The paper presents a classification of mathematical commonly encountered in connection with solution of non−linear finite element problems. The principal methods for numerical solution of the non−linear equations are surveyed and discussed. Special emphasis is placed upon the descriptio

A methodjtir the optimal control of linear time-varying systems with a quadratic cost jitnctional is proposed. The state and control variables are expanded in the shified Legendre series, and an algorithm is provided for approximating the system dynamics, boundary conditions and peyformance index. T