论文信息 - Application of Dual Time Stepping to Fully Implicit Runge Kutta Schemes for Unsteady Flow Calculations

Application of Dual Time Stepping to Fully Implicit Runge Kutta Schemes for Unsteady Flow Calculations

This paper presents the formulation of a dual time stepping procedure to solve the equations of fully implicit Runge-Kutta schemes. In particular the method is applied to Gauss and Radau 2A schemes with either two or three stages. The schemes are tested for unsteady flows over a pitching airfoil modeled by both the Euler and the unsteady Reynolds averaged Navier Stokes (URANS) equations. It is concluded that the Radau 2A schemes are more robust and less computationally expensive because they require a much smaller number of inner iterations. Moreover these schemes seem to be competitive with alternative implicit schemes.

Antony Jameson | A. Jameson

[1] Cord-Christian Rossow,et al. Efficient computation of compressible and incompressible flows , 2007, J. Comput. Phys..

[2] A. Jameson,et al. Numerical solution of the Euler equations by finite volume methods using Runge Kutta time stepping schemes , 1981 .

[3] Eli Turkel,et al. Convergence acceleration of Runge-Kutta schemes for solving the Navier-Stokes equations , 2007, J. Comput. Phys..

[4] John C. Butcher,et al. Integration processes based on Radau quadrature formulas , 1964 .

[5] J. Butcher. Numerical Methods for Ordinary Differential Equations: Butcher/Numerical Methods , 2005 .

[6] J. Butcher. Numerical methods for ordinary differential equations , 2003 .

[7] A. Jameson. Time dependent calculations using multigrid, with applications to unsteady flows past airfoils and wings , 1991 .

[8] G. Dahlquist. A special stability problem for linear multistep methods , 1963 .

[9] A. Jameson. Solution of the Euler equations for two dimensional transonic flow by a multigrid method , 1983 .

[10] J. Butcher. The numerical analysis of ordinary differential equations: Runge-Kutta and general linear methods , 1987 .

[11] J. Butcher. Implicit Runge-Kutta processes , 1964 .

[12] Matematik,et al. Numerical Methods for Ordinary Differential Equations: Butcher/Numerical Methods , 2005 .

[13] Hester Bijl,et al. Implicit Time Integration Schemes for the Unsteady Compressible Navier–Stokes Equations: Laminar Flow , 2002 .