A second order accurate Adams-Bashforth type discrete event integration scheme

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Abstract

This paper proposes a second order accurate, Adams-Bashforth type, asynchronous integration scheme for numerically solving systems of ordinary differential equations. The method has three aspects; a local integration rule with third order truncation error, a third order accurate model of local influences, and local time advance limits. The role of these elements in the scheme's operation are discussed and demonstrated. The time advance limit, which distinguishes this method from other discrete event methods for ODEs, is argued to be essential for constructing high order accuracy schemes.

Original languageEnglish
Title of host publicationProceedings - 21st International Workshop on Principles of Advanced and Distributed Simulation, PADS 2007
Pages25-31
Number of pages7
DOIs
StatePublished - 2007
Event21st International Workshop on Principles of Advanced and Distributed Simulation, PADS 2007 - San Diego, CA, United States
Duration: Jun 12 2007Jun 15 2007

Publication series

NameProceedings - Workshop on Principles of Advanced and Distributed Simulation, PADS

Conference

Conference21st International Workshop on Principles of Advanced and Distributed Simulation, PADS 2007
Country/TerritoryUnited States
CitySan Diego, CA
Period06/12/0706/15/07

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