IMEX Runge-Kutta schemes and hyperbolic systems of conservation laws with stiff diffusive relaxation

S. Boscarino; L. Pareschi; G. Russo

doi:10.1063/1.3241248

IMEX Runge-Kutta schemes and hyperbolic systems of conservation laws with stiff diffusive relaxation

S. Boscarino
, L. Pareschi
, G. Russo

Dipartimento di Matematica EdInformatica
Dipartimento di Matematica

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › peer-review

2 Scopus citations

Abstract

Hyperbolic system of conservation laws often have relaxation terms that, under a suitable scaling, lead to a reduced system of parabolic or hyperbolic type. The development of numerical methods to solve systems of this form his an active area of research. These systems in addition to the stiff relaxation term have the convection term stiff too. In this paper we will mainly concentrate on the study of the stiff regime. In fact in this stiff regime most of the popular methods for the solution of these system fail to capture the correct behavior of the relaxation limit unless the small relaxation rate is numericaly resolved. We will show how to overcome this difficulties and how to construct numerical schemes with the correct asymnptotic limit, i.e., the correct zero-relaxation limit should be preserved at a discrete level.

Original language	English
Title of host publication	Numerical Analysis and Applied Mathematics - International Conference on Numerical Analysis and Applied Mathematics 2009, ICNAAM-2009
Pages	1106-1111
Number of pages	6
DOIs	https://doi.org/10.1063/1.3241248
State	Published - 2009
Externally published	Yes
Event	International Conference on Numerical Analysis and Applied Mathematics 2009, ICNAAM-2009 - Rethymno, Crete, Greece Duration: 18 Sep 2009 → 22 Sep 2009

Publication series

Name	AIP Conference Proceedings
Volume	1168
ISSN (Print)	0094-243X
ISSN (Electronic)	1551-7616

Conference

Conference	International Conference on Numerical Analysis and Applied Mathematics 2009, ICNAAM-2009
Country/Territory	Greece
City	Rethymno, Crete
Period	18/09/09 → 22/09/09

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10.1063/1.3241248

Cite this

Boscarino, S., Pareschi, L., & Russo, G. (2009). IMEX Runge-Kutta schemes and hyperbolic systems of conservation laws with stiff diffusive relaxation. In Numerical Analysis and Applied Mathematics - International Conference on Numerical Analysis and Applied Mathematics 2009, ICNAAM-2009 (pp. 1106-1111). (AIP Conference Proceedings; Vol. 1168). https://doi.org/10.1063/1.3241248

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title = "IMEX Runge-Kutta schemes and hyperbolic systems of conservation laws with stiff diffusive relaxation",

abstract = "Hyperbolic system of conservation laws often have relaxation terms that, under a suitable scaling, lead to a reduced system of parabolic or hyperbolic type. The development of numerical methods to solve systems of this form his an active area of research. These systems in addition to the stiff relaxation term have the convection term stiff too. In this paper we will mainly concentrate on the study of the stiff regime. In fact in this stiff regime most of the popular methods for the solution of these system fail to capture the correct behavior of the relaxation limit unless the small relaxation rate is numericaly resolved. We will show how to overcome this difficulties and how to construct numerical schemes with the correct asymnptotic limit, i.e., the correct zero-relaxation limit should be preserved at a discrete level.",

author = "S. Boscarino and L. Pareschi and G. Russo",

year = "2009",

doi = "10.1063/1.3241248",

language = "English",

isbn = "9780735407091",

series = "AIP Conference Proceedings",

pages = "1106--1111",

booktitle = "Numerical Analysis and Applied Mathematics - International Conference on Numerical Analysis and Applied Mathematics 2009, ICNAAM-2009",

note = "International Conference on Numerical Analysis and Applied Mathematics 2009, ICNAAM-2009 ; Conference date: 18-09-2009 Through 22-09-2009",

}

Boscarino, S, Pareschi, L & Russo, G 2009, IMEX Runge-Kutta schemes and hyperbolic systems of conservation laws with stiff diffusive relaxation. in Numerical Analysis and Applied Mathematics - International Conference on Numerical Analysis and Applied Mathematics 2009, ICNAAM-2009. AIP Conference Proceedings, vol. 1168, pp. 1106-1111, International Conference on Numerical Analysis and Applied Mathematics 2009, ICNAAM-2009, Rethymno, Crete, Greece, 18/09/09. https://doi.org/10.1063/1.3241248

IMEX Runge-Kutta schemes and hyperbolic systems of conservation laws with stiff diffusive relaxation. / Boscarino, S.; Pareschi, L.; Russo, G.
Numerical Analysis and Applied Mathematics - International Conference on Numerical Analysis and Applied Mathematics 2009, ICNAAM-2009. 2009. p. 1106-1111 (AIP Conference Proceedings; Vol. 1168).

Research output: Chapter in Book/Report/Conference proceeding › Conference contribution › peer-review

TY - GEN

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AU - Boscarino, S.

AU - Pareschi, L.

AU - Russo, G.

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N2 - Hyperbolic system of conservation laws often have relaxation terms that, under a suitable scaling, lead to a reduced system of parabolic or hyperbolic type. The development of numerical methods to solve systems of this form his an active area of research. These systems in addition to the stiff relaxation term have the convection term stiff too. In this paper we will mainly concentrate on the study of the stiff regime. In fact in this stiff regime most of the popular methods for the solution of these system fail to capture the correct behavior of the relaxation limit unless the small relaxation rate is numericaly resolved. We will show how to overcome this difficulties and how to construct numerical schemes with the correct asymnptotic limit, i.e., the correct zero-relaxation limit should be preserved at a discrete level.

AB - Hyperbolic system of conservation laws often have relaxation terms that, under a suitable scaling, lead to a reduced system of parabolic or hyperbolic type. The development of numerical methods to solve systems of this form his an active area of research. These systems in addition to the stiff relaxation term have the convection term stiff too. In this paper we will mainly concentrate on the study of the stiff regime. In fact in this stiff regime most of the popular methods for the solution of these system fail to capture the correct behavior of the relaxation limit unless the small relaxation rate is numericaly resolved. We will show how to overcome this difficulties and how to construct numerical schemes with the correct asymnptotic limit, i.e., the correct zero-relaxation limit should be preserved at a discrete level.

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M3 - Conference contribution

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SN - 9780735407091

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BT - Numerical Analysis and Applied Mathematics - International Conference on Numerical Analysis and Applied Mathematics 2009, ICNAAM-2009

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Y2 - 18 September 2009 through 22 September 2009

ER -

IMEX Runge-Kutta schemes and hyperbolic systems of conservation laws with stiff diffusive relaxation

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