A Galerkin model for nonlinear glass plates

A numerical method is proposed to approximate the solution of a nonlinear and nonlocal system of integro-differential equations describing age-dependent population dynamics with spatial diffusion. We use a finite difference method along the characteristic age-time direction combined with finite elem

A general framework of constructing C 0 discontinuous Galerkin (CDG) methods is developed for solving the Kirchhoff plate bending problem, following some ideas in (Castillo et al., 2000) [10] and (Cockburn, 2003) [12]. The numerical traces are determined based on a discrete stability identity, which

A particular discontinuous Galerkin finite element formulation for the simulation of Kirchhoff plates is presented. It is rotation-free and utilises standard C 0 Lagrange finite element basis functions, with the required continuity imposed in a weak sense across element boundaries. The implications