Optimal mesh design for the finite element approximation of reaction–diffusion problems

A new finite volume method is presented for discretizing general linear or nonlinear elliptic second-order partial-differential equations with mixed boundary conditions. The advantage of this method is that arbitrary distorted meshes can be used without the numerical results being altered. The resul

In modern numerical simulation of prospecting and exploiting oil-gas resources and in environmental science, it is necessary to consider numerical method of nonlinear convection-dominated diffusion problems. This thesis, starting from actual conditions such as the three-dimensional characteristics o

A one-dimensional exterior electromagnetic scattering problem is formulated using a differential equation approach followed by a finite element discretization. By interpreting the resulting linear algebraic equations as node voltage equations for a transmission line, a boundary element is obtained w