Unconditionally stable integration of Maxwell’s equations

An unconditionally stable precise integration time-domain method is extended to 3-D circular cylindrical coordinates to solve Maxwell's equations. In contrast with the cylindrical finite-difference time-domain method, not only can it remove the stability condition restraint, but also make the numeri

In this paper, an accurate and computationally implicit 3D finite-difference time-domain (FDTD) method based on the unconditionally stable Crank-Nicolson scheme (3D CN-FDTD) is presented. The source excitation in 3D CN-FDTD is described and the numerical simulation of the 3D CN-FDTD method is demons

A classical method for solving static fceld problems is bmed on Fredholm integral equations. Here we consider the applications of integral equations to the general electromagnetic problem when the applied $elds are alternating. Attention is focused on a problem with cylindrical symmetry. By employin