Discrete Lie Advection of Differential Forms

P. Mullen; A. McKenzie; D. Pavlov; L. Durant; Y. Tong; E. Kanso; J. E. Marsden; M. Desbrun

doi:10.1007/s10208-010-9076-y

Discrete Lie Advection of Differential Forms

P. Mullen
, A. McKenzie
, D. Pavlov
, L. Durant
, Y. Tong
, E. Kanso
, J. E. Marsden
, M. Desbrun

California Institute of Technology Division of Engineering and Applied Science
Michigan State University
University of Southern California

Résultats de recherche: Contribution à un journal › Article › Revue par des pairs

Résumé

In this paper, we present a numerical technique for performing Lie advection of arbitrary differential forms. Leveraging advances in high-resolution finite-volume methods for scalar hyperbolic conservation laws, we first discretize the interior product (also called contraction) through integrals over Eulerian approximations of extrusions. This, along with Cartan's homotopy formula and a discrete exterior derivative, can then be used to derive a discrete Lie derivative. The usefulness of this operator is demonstrated through the numerical advection of scalar fields and 1-forms on regular grids.

langue originale	Anglais
Pages (de - à)	131-149
Nombre de pages	19
journal	Foundations of Computational Mathematics
Volume	11
Numéro de publication	2
Les DOIs	https://doi.org/10.1007/s10208-010-9076-y
état	Publié - 1 janv. 2011
Modification externe	Oui

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10.1007/s10208-010-9076-y

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title = "Discrete Lie Advection of Differential Forms",

abstract = "In this paper, we present a numerical technique for performing Lie advection of arbitrary differential forms. Leveraging advances in high-resolution finite-volume methods for scalar hyperbolic conservation laws, we first discretize the interior product (also called contraction) through integrals over Eulerian approximations of extrusions. This, along with Cartan's homotopy formula and a discrete exterior derivative, can then be used to derive a discrete Lie derivative. The usefulness of this operator is demonstrated through the numerical advection of scalar fields and 1-forms on regular grids.",

keywords = "Discrete Lie derivative, Discrete contraction, Discrete differential forms, Finite-volume methods, Hyperbolic PDEs",

author = "P. Mullen and A. McKenzie and D. Pavlov and L. Durant and Y. Tong and E. Kanso and Marsden, \{J. E.\} and M. Desbrun",

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AU - Mullen, P.

AU - McKenzie, A.

AU - Pavlov, D.

AU - Durant, L.

AU - Tong, Y.

AU - Kanso, E.

AU - Marsden, J. E.

AU - Desbrun, M.

PY - 2011/1/1

Y1 - 2011/1/1

N2 - In this paper, we present a numerical technique for performing Lie advection of arbitrary differential forms. Leveraging advances in high-resolution finite-volume methods for scalar hyperbolic conservation laws, we first discretize the interior product (also called contraction) through integrals over Eulerian approximations of extrusions. This, along with Cartan's homotopy formula and a discrete exterior derivative, can then be used to derive a discrete Lie derivative. The usefulness of this operator is demonstrated through the numerical advection of scalar fields and 1-forms on regular grids.

AB - In this paper, we present a numerical technique for performing Lie advection of arbitrary differential forms. Leveraging advances in high-resolution finite-volume methods for scalar hyperbolic conservation laws, we first discretize the interior product (also called contraction) through integrals over Eulerian approximations of extrusions. This, along with Cartan's homotopy formula and a discrete exterior derivative, can then be used to derive a discrete Lie derivative. The usefulness of this operator is demonstrated through the numerical advection of scalar fields and 1-forms on regular grids.

KW - Discrete Lie derivative

KW - Discrete contraction

KW - Discrete differential forms

KW - Finite-volume methods

KW - Hyperbolic PDEs

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DO - 10.1007/s10208-010-9076-y

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SN - 1615-3375

VL - 11

SP - 131

EP - 149

JO - Foundations of Computational Mathematics

JF - Foundations of Computational Mathematics

IS - 2

ER -

Discrete Lie Advection of Differential Forms

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