AbstractIn this paper, we report new three level implicit super stable methods of order two in time and four in space for the solution of hyperbolic damped wave equations in one, two and three space dimensions subject to given appropriate initial and Dirichlet boundary conditions. We use uniform grid points both in time and space directions. Our methods behave like fourth order accurate, when grid size in time-direction is directly proportional to the square of grid size in space-direction. The proposed methods are super stable. The resulting system of algebraic equations is solved by the Gauss elimination method. We discuss new alternating direction implicit (ADI) methods for two and three dimensional problems. Numerical results and the gr...
In this paper, we propose a new high order three-level implicit method based on off-step discretizat...
Moving grids are of interest in the numerical solution of hydrodynamical problems and in numerical r...
We propose a differential quadrature method (DQM) based on cubic hyperbolic B-spline basis functions...
In this paper, we report new three level implicit super stable methods of order two in time and four...
A class of wave propagation algorithms for three-dimensional conservation laws and other hyperbolic ...
A class of wave propagation algorithms for three-dimensional conservation laws and other hyperbolic ...
A family of finite difference methods is developed for the numerical solution of the simple wave equ...
AbstractIn this article, three-level implicit difference schemes of O(k4 + k2h2 + h4) where k > 0, h...
Abstract. In several recent works [2], [3], we developed a new second order, A-stable ap-proach to w...
It is well known that explicit methods are subject to a restriction on the time step. This restricti...
The numerical solution of multidimensional wave-propagation problems is considerably more complex th...
This paper proposes a self-starting, second-order accurate, composite s-sub-step explicit method, wi...
A new PDE solver was introduced recently, in Part I of this two-paper sequence, on the basis of two ...
AbstractA new second-order alternating direction implicit (ADI) scheme, based on the idea of the ope...
A numerical method is presented to solve a two-dimensional hyperbolic diffusion problem where is ass...
In this paper, we propose a new high order three-level implicit method based on off-step discretizat...
Moving grids are of interest in the numerical solution of hydrodynamical problems and in numerical r...
We propose a differential quadrature method (DQM) based on cubic hyperbolic B-spline basis functions...
In this paper, we report new three level implicit super stable methods of order two in time and four...
A class of wave propagation algorithms for three-dimensional conservation laws and other hyperbolic ...
A class of wave propagation algorithms for three-dimensional conservation laws and other hyperbolic ...
A family of finite difference methods is developed for the numerical solution of the simple wave equ...
AbstractIn this article, three-level implicit difference schemes of O(k4 + k2h2 + h4) where k > 0, h...
Abstract. In several recent works [2], [3], we developed a new second order, A-stable ap-proach to w...
It is well known that explicit methods are subject to a restriction on the time step. This restricti...
The numerical solution of multidimensional wave-propagation problems is considerably more complex th...
This paper proposes a self-starting, second-order accurate, composite s-sub-step explicit method, wi...
A new PDE solver was introduced recently, in Part I of this two-paper sequence, on the basis of two ...
AbstractA new second-order alternating direction implicit (ADI) scheme, based on the idea of the ope...
A numerical method is presented to solve a two-dimensional hyperbolic diffusion problem where is ass...
In this paper, we propose a new high order three-level implicit method based on off-step discretizat...
Moving grids are of interest in the numerical solution of hydrodynamical problems and in numerical r...
We propose a differential quadrature method (DQM) based on cubic hyperbolic B-spline basis functions...