A hybrid finite element approach to the solution of creep problems

This paper presents the novel application of a vertex-centred control volume numerical scheme commonly known as the control volume finite element method to creep problems. The discretization procedure is described in detail and is valid for both structured and unstructured grids without alteration t

A general framework is developed for the finite element solution of optimal control problems governed by elliptic nonlinear partial differential equations. Typical applications are steady-state problems in nonlinear continuum mechanics, where a certain property of the solution (a function of displac

ntroduction Tim finite element method [2] is a well-known and time-tested technique for dew?loping approximate solutions to static or dynamic problems in stress analysis. Using this method, regions with rather complex geometries are discretized into a number of small units, called finite elements. F