Abstract
The analysis of strong-stability-preserving (SSP) linear multistep methods is extended to semi-discretized problems for which different terms on the right-hand side satisfy different forward Euler (or circle) conditions. Optimal perturbed and additive monotonicity-preserving linear multistep methods are studied in the context of such problems. Optimal perturbed methods attain larger monotonicity-preserving step sizes when the different forward Euler conditions are taken into account. On the other hand, we show that optimal SSP additive methods achieve a monotonicity-preserving step-size restriction no better than that of the corresponding nonadditive SSP linear multistep methods.
Original language | English (US) |
---|---|
Pages (from-to) | 2295-2320 |
Number of pages | 26 |
Journal | Mathematics of Computation |
Volume | 87 |
Issue number | 313 |
DOIs | |
State | Published - Feb 20 2018 |