Runge-Kutta Methods and Stiff Order Conditions for Semilinear ODEs

Classical convergence theory of Runge-Kutta methods assumes that the time step is small relative to the Lipschitz constant of the ordinary differential equation (ODE). For stiff problems, that assumption is often violated, and a problematic degradation in accuracy, known as order reduction, can arise. High stage order methods can avoid order reduction, but they must be fully implicit. For linear problems, weaker stiff order conditions exist and are compatible with computationally efficient methods, i.e., explicit or diagonally implicit. This work develops a new theory of stiff order conditions and convergence for semilinear ODEs, consisting of a stiff linear term and a non-stiff nonlinear term. New semilinear order conditions are formulated in terms of orthogonality relations enumerated by rooted trees. Novel, optimized diagonally implicit methods are constructed that satisfy these semilinear conditions. Numerical results demonstrate that for a broad class of relevant nonlinear test problems, these new methods successfully mitigate order reduction and yield highly accurate numerical approximations.