A geometrical approach to bifurcation for nonlinear boundary value problems

A variational formulation is established for a nonlinear two-point boundary value problem, an analytical solution is obtained using the Ritz method, and the obtained solution is valid for the whole solution domain.

In this paper we propose a numerical approach to solve some problems connected with the implementation of the Newton type methods for the resolution of the nonlinear system of equations related to the discretization of a nonlinear two-point BVPs for ODEs with mixed linear boundary conditions by usin

Starting from three-dimensional theory, a global minimum principle for stresses in elastic-plastic shells subjected to arbitrary conservative loading histories is presented. Finite displacements but small strains are considered. For numerical illustration, the stress state in an elastic-plastic cyli