Multisymplectic Geometry and Its Appiications for the Schrodinger Equation in Quantum Mechanics 被引量：1

Multisymplectic Geometry and Its Appiications for the Schrodinger Equation in Quantum Mechanics

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摘要 Multisymplectic geometry for the Schrodinger equation in quantum mechanics is presented. This formalism of multisymplectic geometry provides a concise and complete introduction to the Schrodinger equation. The Schrodinger equation, its associated energy and momentum evolution equations, and the multisymplectic form are derived directly from the variational principle. Some applications are also explored. Multisymplectic geometry for the Schrodinger equation in quantum mechanics is presented. This formalism of multisymplectic geometry provides a concise and complete introduction to the Schrodinger equation. The Schrodinger equation, its associated energy and momentum evolution equations, and the multisymplectic form are derived directly from the variational principle. Some applications are also explored.

作者陈景波

机构地区 Institute of Geology and Geophysics

出处《Chinese Physics Letters》 SCIE CAS CSCD 2007年第2期370-373,共4页 中国物理快报（英文版）

基金 Supported by National Natural Science Foundation of China under grant No 40474047.

分类号 O413 [理学—理论物理]

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参考文献13

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Chinese Physics Letters

2007年第2期

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Multisymplectic Geometry and Its Appiications for the Schrodinger Equation in Quantum Mechanics 被引量：1

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