@article{Preuss-2022-When,
title = "When and how to split? A comparison of two IMEX splitting techniques for solving advection{--}diffusion{--}reaction equations",
author = "Preuss, Adam and
Lipoth, Jessica and
Spiteri, Raymond J.",
journal = "Journal of Computational and Applied Mathematics, Volume 414",
volume = "414",
year = "2022",
publisher = "Elsevier BV",
url = "https://gwf-uwaterloo.github.io/gwf-publications/G22-31001",
doi = "10.1016/j.cam.2022.114418",
pages = "114418",
abstract = "Many mathematical models of natural phenomena are described by partial differential equations (PDEs) that consist of additive contributions from different physical processes. Classical methods for the numerical solution to such equations are monolithic in that all processes are treated with a single method. Additive numerical methods, in contrast, apply distinct methods to each additive term. There are, however, different ways mathematically to specify the additive terms, and it is not always clear which ways (if any) offer advantages over monolithic methods. This study compares the performance of two different additive splitting techniques (physics-based splitting and dynamic linearization) on a suite of eight test problems that involve advection, reaction, and diffusion with various 2-additive Runge{--}Kutta methods and (monolithic) Runge{--}Kutta{--}Chebyshev (RKC) methods. Results show that dynamic linearization generally outperforms physics-based splitting and so should be preferred as the splitting technique when splitting is required or otherwise desirable. RKC methods are the best performers on three of the eight problems, especially at coarse tolerances, but they can also be prone to severe underperformance.",
}
<?xml version="1.0" encoding="UTF-8"?>
<modsCollection xmlns="http://www.loc.gov/mods/v3">
<mods ID="Preuss-2022-When">
<titleInfo>
<title>When and how to split? A comparison of two IMEX splitting techniques for solving advection–diffusion–reaction equations</title>
</titleInfo>
<name type="personal">
<namePart type="given">Adam</namePart>
<namePart type="family">Preuss</namePart>
<role>
<roleTerm authority="marcrelator" type="text">author</roleTerm>
</role>
</name>
<name type="personal">
<namePart type="given">Jessica</namePart>
<namePart type="family">Lipoth</namePart>
<role>
<roleTerm authority="marcrelator" type="text">author</roleTerm>
</role>
</name>
<name type="personal">
<namePart type="given">Raymond</namePart>
<namePart type="given">J</namePart>
<namePart type="family">Spiteri</namePart>
<role>
<roleTerm authority="marcrelator" type="text">author</roleTerm>
</role>
</name>
<originInfo>
<dateIssued>2022</dateIssued>
</originInfo>
<typeOfResource>text</typeOfResource>
<genre authority="bibutilsgt">journal article</genre>
<relatedItem type="host">
<titleInfo>
<title>Journal of Computational and Applied Mathematics, Volume 414</title>
</titleInfo>
<originInfo>
<issuance>continuing</issuance>
<publisher>Elsevier BV</publisher>
</originInfo>
<genre authority="marcgt">periodical</genre>
<genre authority="bibutilsgt">academic journal</genre>
</relatedItem>
<abstract>Many mathematical models of natural phenomena are described by partial differential equations (PDEs) that consist of additive contributions from different physical processes. Classical methods for the numerical solution to such equations are monolithic in that all processes are treated with a single method. Additive numerical methods, in contrast, apply distinct methods to each additive term. There are, however, different ways mathematically to specify the additive terms, and it is not always clear which ways (if any) offer advantages over monolithic methods. This study compares the performance of two different additive splitting techniques (physics-based splitting and dynamic linearization) on a suite of eight test problems that involve advection, reaction, and diffusion with various 2-additive Runge–Kutta methods and (monolithic) Runge–Kutta–Chebyshev (RKC) methods. Results show that dynamic linearization generally outperforms physics-based splitting and so should be preferred as the splitting technique when splitting is required or otherwise desirable. RKC methods are the best performers on three of the eight problems, especially at coarse tolerances, but they can also be prone to severe underperformance.</abstract>
<identifier type="citekey">Preuss-2022-When</identifier>
<identifier type="doi">10.1016/j.cam.2022.114418</identifier>
<location>
<url>https://gwf-uwaterloo.github.io/gwf-publications/G22-31001</url>
</location>
<part>
<date>2022</date>
<detail type="volume"><number>414</number></detail>
<detail type="page"><number>114418</number></detail>
</part>
</mods>
</modsCollection>
%0 Journal Article
%T When and how to split? A comparison of two IMEX splitting techniques for solving advection–diffusion–reaction equations
%A Preuss, Adam
%A Lipoth, Jessica
%A Spiteri, Raymond J.
%J Journal of Computational and Applied Mathematics, Volume 414
%D 2022
%V 414
%I Elsevier BV
%F Preuss-2022-When
%X Many mathematical models of natural phenomena are described by partial differential equations (PDEs) that consist of additive contributions from different physical processes. Classical methods for the numerical solution to such equations are monolithic in that all processes are treated with a single method. Additive numerical methods, in contrast, apply distinct methods to each additive term. There are, however, different ways mathematically to specify the additive terms, and it is not always clear which ways (if any) offer advantages over monolithic methods. This study compares the performance of two different additive splitting techniques (physics-based splitting and dynamic linearization) on a suite of eight test problems that involve advection, reaction, and diffusion with various 2-additive Runge–Kutta methods and (monolithic) Runge–Kutta–Chebyshev (RKC) methods. Results show that dynamic linearization generally outperforms physics-based splitting and so should be preferred as the splitting technique when splitting is required or otherwise desirable. RKC methods are the best performers on three of the eight problems, especially at coarse tolerances, but they can also be prone to severe underperformance.
%R 10.1016/j.cam.2022.114418
%U https://gwf-uwaterloo.github.io/gwf-publications/G22-31001
%U https://doi.org/10.1016/j.cam.2022.114418
%P 114418
Markdown (Informal)
[When and how to split? A comparison of two IMEX splitting techniques for solving advection–diffusion–reaction equations](https://gwf-uwaterloo.github.io/gwf-publications/G22-31001) (Preuss et al., GWF 2022)
ACL
- Adam Preuss, Jessica Lipoth, and Raymond J. Spiteri. 2022. When and how to split? A comparison of two IMEX splitting techniques for solving advection–diffusion–reaction equations. Journal of Computational and Applied Mathematics, Volume 414, 414:114418.
