A Two-Stage Fourth-Order Multimoment Global Shallow-Water Model on the Cubed Sphere

Author:

Che Yuzhang1,Chen Chungang2,Xiao Feng3,Li Xingliang4,Shen Xueshun4

Affiliation:

1. College of Atmospheric Science, Chengdu University of Information Technology, Chengdu, China, and Department of Mechanical Engineering, Tokyo Institute of Technology, Tokyo, Japan

2. State Key Laboratory for Strength and Vibration of Mechanical Structures, and School of Aerospace Engineering, Xi’an Jiaotong University, Xi’an, Shaanxi, China

3. Department of Mechanical Engineering, Tokyo Institute of Technology, Tokyo, Japan

4. Center of Numerical Weather Prediction of National Meteorological Center, China Meteorological Administration, Beijing, China

Abstract

AbstractA new multimoment global shallow-water model on the cubed sphere is proposed by adopting a two-stage fourth-order Runge–Kutta time integration. Through calculating the values of predicted variables at half time step t = tn + (1/2)Δt by a second-order formulation, a fourth-order scheme can be derived using only two stages within one time step. This time integration method is implemented in our multimoment global shallow-water model to build and validate a new and more efficient numerical integration framework for dynamical cores. As the key task, the numerical formulation for evaluating the derivatives in time has been developed through the Cauchy–Kowalewski procedure and the spatial discretization of the multimoment finite-volume method, which ensures fourth-order accuracy in both time and space. Several major benchmark tests are used to verify the proposed numerical framework in comparison with the existing four-stage fourth-order Runge–Kutta method, which is based on the method of lines framework. The two-stage fourth-order scheme saves about 30% of the computational cost in comparison with the four-stage Runge–Kutta scheme for global advection and shallow-water models. The proposed two-stage fourth-order framework offers a new option to develop high-performance time marching strategy of practical significance in dynamical cores for atmospheric and oceanic models.

Funder

National Outstanding Youth Science Fund Project of National Natural Science Foundation of China

Young Scientists Fund

National Key Research and Development Program of China

Publisher

American Meteorological Society

Subject

Atmospheric Science

Reference26 articles.

1. On explicit two derivative Runge-Kutta methods;Chan;Numer. Algor.,2010

2. Shallow water model on cubed-sphere by multi-moment finite volume method;Chen;J. Comput. Phys.,2008

3. A two-stage fourth-order discontinuous Galerkin method based on the GRP solver for the compressible Euler equations;Cheng;Comput. Fluids,2019

4. TVB Runge-Kutta local projection discontinuous Galerkin finite element method for conservation laws. II. General framework;Cockburn;Math. Comput.,1989

5. Numerical Methods for Fluid Dynamics

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