AbstractIn this paper, we develop implicit difference schemes of O(k4 + k2h2 + h4), where k > 0, h > 0 are grid sizes in time and space coordinates, respectively, for solving the system of two space dimensional second order nonlinear hyperbolic partial differential equations with variable coefficients having mixed derivatives subject to appropriate initial and boundary conditions. The proposed difference method for the scalar equation is applied for the solution of wave equation in polar coordinates to obtain three level conditionally stable ADI method of O(k4 + k2h2 + h4). Some physical nonlinear problems are provided to demonstrate the accuracy of the implementation
AbstractA fourth-order accurate difference scheme for systems of hyperbolic equations is presented. ...
AbstractAn efficient numerical method based on quintic nonpolynomial spline basis and high order fin...
Fourth order difference approximations of initial-boundary value problems for hyperbolic partial dif...
AbstractIn this article, three-level implicit difference schemes of O(k4 + k2h2 + h4) where k > 0, h...
AbstractIn this article, two-level compact implicit difference methods of O(k2 + kh2 + h4) using 9-s...
AbstractImplicit difference schemes of O(k4 + k2h2 + h4), where k0, h 0 are grid sizes in time and s...
AbstractIn this article, two-level implicit difference methods of O(k2 + h4) using 19-spatial grid p...
AbstractIn this article, we derive difference methods of O(h4) for solving the system of two space n...
AbstractWe propose a new two-level implicit difference method of O(k2+kh2+h4) for the solution of si...
AbstractAn implicit three-level difference scheme of O(k2 + h2) is discussed for the numerical solut...
AbstractWe investigate difference schemes for systems of first order hyperbolic differential equatio...
A family of methods is developed for the numerical solution of fourth order parabolic partial diffe...
AbstractIn this paper, we propose a three level compact difference scheme of O(τ4+h4) for the differ...
AbstractThe three-level explicit scheme is efficient for numerical approximation of the second-order...
AbstractA new second-order alternating direction implicit (ADI) scheme, based on the idea of the ope...
AbstractA fourth-order accurate difference scheme for systems of hyperbolic equations is presented. ...
AbstractAn efficient numerical method based on quintic nonpolynomial spline basis and high order fin...
Fourth order difference approximations of initial-boundary value problems for hyperbolic partial dif...
AbstractIn this article, three-level implicit difference schemes of O(k4 + k2h2 + h4) where k > 0, h...
AbstractIn this article, two-level compact implicit difference methods of O(k2 + kh2 + h4) using 9-s...
AbstractImplicit difference schemes of O(k4 + k2h2 + h4), where k0, h 0 are grid sizes in time and s...
AbstractIn this article, two-level implicit difference methods of O(k2 + h4) using 19-spatial grid p...
AbstractIn this article, we derive difference methods of O(h4) for solving the system of two space n...
AbstractWe propose a new two-level implicit difference method of O(k2+kh2+h4) for the solution of si...
AbstractAn implicit three-level difference scheme of O(k2 + h2) is discussed for the numerical solut...
AbstractWe investigate difference schemes for systems of first order hyperbolic differential equatio...
A family of methods is developed for the numerical solution of fourth order parabolic partial diffe...
AbstractIn this paper, we propose a three level compact difference scheme of O(τ4+h4) for the differ...
AbstractThe three-level explicit scheme is efficient for numerical approximation of the second-order...
AbstractA new second-order alternating direction implicit (ADI) scheme, based on the idea of the ope...
AbstractA fourth-order accurate difference scheme for systems of hyperbolic equations is presented. ...
AbstractAn efficient numerical method based on quintic nonpolynomial spline basis and high order fin...
Fourth order difference approximations of initial-boundary value problems for hyperbolic partial dif...