A fourth-order compact finite difference scheme for solving an N-carrier system with Neumann boundary conditions

## Abstract Recently, we have developed a higher‐order and unconditionally stable compact finite difference scheme for solving a model of energy exchanges in an N‐carrier system with Neumann boundary conditions, which extends the concept of the well‐known parabolic two‐step model for microheat tran

## Abstract In this article, two sets of fourth‐order compact finite difference schemes are constructed for solving heat‐conducting problems of two or three dimensions, respectively. Both problems are with Neumann boundary conditions. These works are extensions of our earlier work (Zhao et al., Fou

## Abstract A linearized three‐level difference scheme on nonuniform meshes is derived by the method of the reduction of order for the Neumann boundary value problem of a nonlinear parabolic system. It is proved that the difference scheme is uniquely solvable and second‐order convergent in __L__~__