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arxiv hep-th/0703224 v3 pith:DCM2KAM2 submitted 2007-03-26 hep-th

Integrable subsystem of Yang--Mills dilaton theory

classification hep-th
keywords solutionsintegrablesubsystemdilatoninfinitelymanytheoryyang-mills
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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With the help of the Cho-Faddeev-Niemi-Shabanov decomposition of the SU(2) Yang-Mills field, we find an integrable subsystem of SU(2) Yang-Mills theory coupled to the dilaton. Here integrability means the existence of infinitely many symmetries and infinitely many conserved currents. Further, we construct infinitely many static solutions of this integrable subsystem. These solutions can be identified with certain limiting solutions of the full system, which have been found previously in the context of numerical investigations of the Yang-Mills dilaton theory. In addition, we derive a Bogomolny bound for the integrable subsystem and show that our static solutions are, in fact, Bogomolny solutions. This explains the linear growth of their energies with the topological charge, which has been observed previously. Finally, we discuss some generalisations.

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