New Algebra of Local Symmetries for Regge Limit of Yang-Mills Theories

Details New Algebra of Local Symmetries for Regge Limit of Yang-Mills Theories New Algebra of Local Symmetries for Regge Limit of Yang-Mills Theories

1998-03-12

arxiv.org/abs/hep-th/9803102v1

Physics

High Energy Physics

High Energy Physics - Theory

LaTex, 8 pages

Scientific paper

Local effective action is derived to describe Regge asymptotic of Yang-Mills theories. Local symmetries of the effective action originating from the gauge symmetry of the underlying Yang-Mills theory are studied. Multicomponent effective action is introduced to express the symmetry transformations as field transformations. The algebra of these symmetries is decomposed onto a semi-direct sum of commutative algebras and four copies of the gauge algebra of the underlying Yang-Mills theory. Possibility of existence of solitons corresponding to the commutative subalgebra of the symmetry algebra is mentioned.

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