LStableDirk2
Second order diagonally implicit Runge Kutta method (Dirk) with two stages.
This method can be expressed as a Runge-Kutta method with the following Butcher Tableau:
where
The stability function for this method is:
The method is L-stable:
Notes
This method is derived in detail in Alexander (1977). This method is more expensive than Crank-Nicolson, but has the advantage of being L-stable (the same type of stability as the implicit Euler method) so may be more suitable for "stiff" problems.
Input Parameters
- control_tagsAdds user-defined labels for accessing object parameters via control logic.
C++ Type:std::vector<std::string>
Controllable:No
Description:Adds user-defined labels for accessing object parameters via control logic.
- enableTrueSet the enabled status of the MooseObject.
Default:True
C++ Type:bool
Controllable:No
Description:Set the enabled status of the MooseObject.
References
- R. Alexander.
Diagonally implicit runge-kutta methods for stiff odes.
SIAM J. Numer. Anal., 14(6):1006–1021, 1977.[BibTeX]