Internal Error Propagation in Explicit Runge--Kutta Methods

Research output: Contribution to journalArticlepeer-review

1 Scopus citations


In practical computation with Runge--Kutta methods, the stage equations are not satisfied exactly, due to roundoff errors, algebraic solver errors, and so forth. We show by example that propagation of such errors within a single step can have catastrophic effects for otherwise practical and well-known methods. We perform a general analysis of internal error propagation, emphasizing that it depends significantly on how the method is implemented. We show that for a fixed method, essentially any set of internal stability polynomials can be obtained by modifying the implementation details. We provide bounds on the internal error amplification constants for some classes of methods with many stages, including strong stability preserving methods and extrapolation methods. These results are used to prove error bounds in the presence of roundoff or other internal errors.
Original languageEnglish (US)
Pages (from-to)2227-2249
Number of pages23
JournalSIAM Journal on Numerical Analysis
Issue number5
StatePublished - Sep 17 2014


Dive into the research topics of 'Internal Error Propagation in Explicit Runge--Kutta Methods'. Together they form a unique fingerprint.

Cite this