Nonlocal Lagrangian
In field theory, a nonlocal Lagrangian is a Lagrangian, a type of functional containing terms that are nonlocal in the fields , i.e. not polynomials or functions of the fields or their derivatives evaluated at a single point in the space of dynamical parameters (e.g. space-time). Examples of such nonlocal Lagrangians might be:
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* The Wess–Zumino–Witten action.
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Nonlocal Lagrangian
In field theory, a nonlocal Lagrangian is a Lagrangian, a type of functional containing terms that are nonlocal in the fields , i.e. not polynomials or functions of the fields or their derivatives evaluated at a single point in the space of dynamical parameters (e.g. space-time). Examples of such nonlocal Lagrangians might be:
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*
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* The Wess–Zumino–Witten action.
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In field theory, a nonlocal La ...... ives rise to nonlocal actions.
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In field theory, a nonlocal La ...... The Wess–Zumino–Witten action.
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Nonlocal Lagrangian
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