A Lyapunov Formulation for Efficient Solution of the Poisson and Convection–Diffusion Equations by the Differential Quadrature Method

## Abstract In this work, accurate solutions to linear and nonlinear diffusion equations were introduced. A polynomial‐based differential quadrature scheme in space and a strong stability preserving Runge–Kutta scheme in time have been combined for solving these equations. This scheme needs less st

The paper is concerned with the stability of the zero solution of the impulsive system method is used as a tool in obtaining the criteria for stability, asymptotic stability, and instability of the trivial solution.

A multilevel Petrov-Galerkin (PG) finite element method to accurately solve the one-dimensional convection-diffusion equation is presented. In this method, the weight functions are different from the basis functions and they are calculated from simple algebraic recursion relations. The basis for the

A new high order FV method is presented for the solution of convection±diusion equations, based on a 4-point approximation of the diusive term and on the de®nition of a quadratic pro®le for the approximation of the convective term, in which coecients are obtained by imposing conditions on the trunca