Ggeneralized formulations of fundamental schemes for efficient unconditionally stable implicit finite-difference time-domain (FDTD) methods are presented. The fundamental schemes constitute a family of implicit schemes that feature similar fundamental updating structures, which are in simplest forms with most efficient right-hand sides. The formulations of fundamental schemes are presented in terms of generalized matrix operator equations pertaining to some classical splitting formulae, including those of alternating direction implicit, locally one-dimensional and split-step schemes. To provide further insights into the implications and significance of fundamental schemes, the analyses are also extended to many other schemes with distinctiv...
This letter presents a new efficient algorithm for the unconditionally stable three-dimensional alte...
Abstract—In this paper, an unconditionally stable three-dimen-sional (3-D) finite-difference time-me...
This article presents the multiple one-dimensional (M1-D) fundamental alternating direction implicit...
This communication presents further reinterpretation of multi-stage implicit finite-difference time-...
Explicit FDTD method is one of the most popular methods for time domain analysis because it does not...
Abstract—In this paper, a finite-difference time-domain method that is free of the constraint of the...
The leapfrog schemes have been developed for unconditionally stable alternating-direction implicit (...
This paper discusses some recent developments in fundamental implicit FDTD schemes. The formulations...
The leapfrog schemes have been developed for unconditionally stable alternating-direction implicit (...
Recently, there has been increasing interest in the development of unconditionally stable finite-dif...
This thesis proposes several new finite-difference time-domain (FDTD) methods to overcome shortcomin...
This paper presents the current source implementations for the fundamental second-order accurate spl...
The finite-difference time-domain (FDTD) method has been widely applied in solving electromagnetic p...
The finite-difference time-domain (FDTD) method has been widely used for solving various electromagn...
In this thesis, the alternating-direction implicit method (ADI) is investigated in conjunction with ...
This letter presents a new efficient algorithm for the unconditionally stable three-dimensional alte...
Abstract—In this paper, an unconditionally stable three-dimen-sional (3-D) finite-difference time-me...
This article presents the multiple one-dimensional (M1-D) fundamental alternating direction implicit...
This communication presents further reinterpretation of multi-stage implicit finite-difference time-...
Explicit FDTD method is one of the most popular methods for time domain analysis because it does not...
Abstract—In this paper, a finite-difference time-domain method that is free of the constraint of the...
The leapfrog schemes have been developed for unconditionally stable alternating-direction implicit (...
This paper discusses some recent developments in fundamental implicit FDTD schemes. The formulations...
The leapfrog schemes have been developed for unconditionally stable alternating-direction implicit (...
Recently, there has been increasing interest in the development of unconditionally stable finite-dif...
This thesis proposes several new finite-difference time-domain (FDTD) methods to overcome shortcomin...
This paper presents the current source implementations for the fundamental second-order accurate spl...
The finite-difference time-domain (FDTD) method has been widely applied in solving electromagnetic p...
The finite-difference time-domain (FDTD) method has been widely used for solving various electromagn...
In this thesis, the alternating-direction implicit method (ADI) is investigated in conjunction with ...
This letter presents a new efficient algorithm for the unconditionally stable three-dimensional alte...
Abstract—In this paper, an unconditionally stable three-dimen-sional (3-D) finite-difference time-me...
This article presents the multiple one-dimensional (M1-D) fundamental alternating direction implicit...