Abstract
Guided by the example of gauge transformations associated with classical Yang-Mills fields, a very general class of transformations is considered. The explicit representation of these transformations involves not only the independent and the dependent field variables, but also a set of position-dependent parameters together with their first derivatives. The stipulation that an action integral associated with the field variables be invariant under such transformations gives rise to a set of three conditions involving the Lagrangian and its derivatives, together with derivatives of the functions that define the transformations. These invariance identities constitute an extension of the classical theorem of Noether to general transformations of this kind. An application to the case of gauge fields demonstrates the existence of two distinct types of conservation laws for such fields.
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This research was sponsored in part by the National Science Foundation under Grant NSF GP 43070.
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Rund, H. An extension of Noether's theorem to transformations involving position-dependent parameters and their derivatives. Found Phys 11, 809–838 (1981). https://doi.org/10.1007/BF00727101
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DOI: https://doi.org/10.1007/BF00727101