Lagrange-Poincaré field equations

David C.P. Ellis; François Gay-Balmaz; Darryl D. Holm; Tudor S. Ratiu

doi:10.1016/j.geomphys.2011.06.007

Lagrange-Poincaré field equations

David C.P. Ellis
, François Gay-Balmaz
, Darryl D. Holm
, Tudor S. Ratiu

Research output: Contribution to journal › Article › peer-review

Abstract

The Lagrange-Poincaré equations of classical mechanics are cast into a field theoretic context together with their associated constrained variational principle. An integrability/reconstruction condition is established that relates solutions of the original problem with those of the reduced problem. The Kelvin-Noether Theorem is formulated in this context. Applications to the isoperimetric problem, the Skyrme model for meson interaction, and molecular strands illustrate various aspects of the theory.

Original language	English
Pages (from-to)	2120-2146
Number of pages	27
Journal	Journal of Geometry and Physics
Volume	61
Issue number	11
DOIs	https://doi.org/10.1016/j.geomphys.2011.06.007
Publication status	Published - 1 Jan 2011

Keywords

Conservation laws
Covariant reduction
Euler-Lagrange equations
Field theories
Symmetries

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10.1016/j.geomphys.2011.06.007

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title = "Lagrange-Poincar{\'e} field equations",

abstract = "The Lagrange-Poincar{\'e} equations of classical mechanics are cast into a field theoretic context together with their associated constrained variational principle. An integrability/reconstruction condition is established that relates solutions of the original problem with those of the reduced problem. The Kelvin-Noether Theorem is formulated in this context. Applications to the isoperimetric problem, the Skyrme model for meson interaction, and molecular strands illustrate various aspects of the theory.",

keywords = "Conservation laws, Covariant reduction, Euler-Lagrange equations, Field theories, Symmetries",

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doi = "10.1016/j.geomphys.2011.06.007",

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AU - Ellis, David C.P.

AU - Gay-Balmaz, François

AU - Holm, Darryl D.

AU - Ratiu, Tudor S.

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Y1 - 2011/1/1

N2 - The Lagrange-Poincaré equations of classical mechanics are cast into a field theoretic context together with their associated constrained variational principle. An integrability/reconstruction condition is established that relates solutions of the original problem with those of the reduced problem. The Kelvin-Noether Theorem is formulated in this context. Applications to the isoperimetric problem, the Skyrme model for meson interaction, and molecular strands illustrate various aspects of the theory.

AB - The Lagrange-Poincaré equations of classical mechanics are cast into a field theoretic context together with their associated constrained variational principle. An integrability/reconstruction condition is established that relates solutions of the original problem with those of the reduced problem. The Kelvin-Noether Theorem is formulated in this context. Applications to the isoperimetric problem, the Skyrme model for meson interaction, and molecular strands illustrate various aspects of the theory.

KW - Conservation laws

KW - Covariant reduction

KW - Euler-Lagrange equations

KW - Field theories

KW - Symmetries

UR - https://www.scopus.com/pages/publications/79960354465

U2 - 10.1016/j.geomphys.2011.06.007

DO - 10.1016/j.geomphys.2011.06.007

M3 - Article

AN - SCOPUS:79960354465

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VL - 61

SP - 2120

EP - 2146

JO - Journal of Geometry and Physics

JF - Journal of Geometry and Physics

IS - 11

ER -

Lagrange-Poincaré field equations

Abstract

Keywords

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