An extrapolation cascadic multigrid method combined with a fourth order compact scheme for 3D poisson equation

TL;DR

This paper introduces an efficient extrapolation cascadic multigrid (EXCMG) method combined with a fourth-order compact scheme for solving 3D Poisson equations, achieving high accuracy with fewer iterations.

Contribution

The paper develops a novel EXCMG method that integrates Richardson extrapolation and high-order interpolation to significantly improve efficiency and accuracy for 3D Poisson problems.

Findings

EXCMG outperforms classical multigrid methods in efficiency.

Only a few CG iterations needed for full fourth-order accuracy.

Method remains effective with solutions of lower regularity.

Abstract

In this paper, we develop an EXCMG method to solve the three-dimensional Poisson equation on rectangular domains by using the compact finite difference (FD) method with unequal meshsizes in different coordinate directions. The resulting linear system from compact FD discretization is solved by the conjugate gradient (CG) method with a relative residual stopping criterion. By combining the Richardson extrapolation and tri-quartic Lagrange interpolation for the numerical solutions from two-level of grids (current and previous grids), we are able to produce an extremely accurate approximation of the actual numerical solution on the next finer grid, which can greatly reduce the number of relaxation sweeps needed. Additionally, a simple method based on the midpoint extrapolation formula is used for the fourth-order FD solutions on two-level of grids to achieve sixth-order accuracy on the entire fine grid cheaply and directly. The gradient of the numerical solution can also be easily obtained through solving a series of tridiagonal linear systems resulting from the fourth-order compact FD discretizations. Numerical results show that our EXCMG method is much more efficient than the classical V-cycle and W-cycle multigrid methods. Moreover, only few CG iterations are required on the finest grid to achieve full fourth-order accuracy in both the $L^2$-norm and $L^{\infty}$-norm for the solution and its gradient when the exact solution belongs to $C^6$. Finally, numerical result shows that our EXCMG method is still effective when the exact solution has a lower regularity, which widens the scope of applicability of our EXCMG method.