An accurate low-order discretization scheme for the identity operator in the magnetic field and combined field integral equations

A new low-order discretization scheme for the identity operator in the magnetic field integral equation (MFIE) is discussed. Its concept is derived from the weak-form representation of combined sources that are discretized with Rao-Wilton-Glisson functions. The resulting MFIE overcomes the accuracy problem of the classical MFIE while it maintains fast iterative-solver convergence. The improvement in accuracy is verified with a mesh refinement analysis and with near- A nd far-field scattering results. Furthermore, simulation results for a combined field integral equation (CFIE) involving the new MFIE show that this CFIE is interior resonance free and well-conditioned like the classical CFIE but also accurate as the electric field integral equation.