A minimum configuration fourth-order nonautonomous explicit Rosenbrock method for nonstiff differential equations

A generalized and more complete methodology for treating boundary conditions in the Differential Quadrature Method (DQM) is presented. This improved approach eliminates the deficiencies of the -type grid arrangement, which represents an approximation, by applying the boundary conditions exactly. Two

A family of numerical methods which are L-stable, fourth-order accurate in space and time, and do not require the use of complex arithmetic is developed for solving second-order linear parabolic partial differential equations. In these methods, second-order spatial derivatives are approximated by fo

A new finite difference scheme with minimal phase-lag for the numerical solutton of fourth-order differential equations with engineering applications is developed in this paper. Numerical and theoretical results show that this new approach is more efficient compared with previously derived methods.