Joly–Mercier boundary condition for the finite element solution of 3D Maxwell equations

New families of radiation boundary operators are proposed for ®nite element simulations of wave propagation problems characterized by the scalar wave equation. These operators have the form Bu j1 Cu j ; j 1; 2; . . . ; J ; where B is the Dirichlet, Neumann, or the Robin operator, and C is an appropr

We develop, implement, and demonstrate a reflectionless sponge layer for truncating computational domains in which the time-dependent Maxwell equations are discretized with high-order staggered nondissipative finite difference schemes. The well-posedness of the Cauchy problem for the sponge layer eq

The appropriate specification of boundary conditions is the main difficulty in the finite element solution of the streamfunction-vorticity equations for two-dimensional incompressible laminar flows. In this context, we show that the appropriate specification of both the outflow and the inflow bounda