Spinning particles in a Yang-Mills field
Abstract
Suppose that a Lie group G acts properly on a configuration manifold Q. We study the symplectic quotient of T*Q with respect to the cotangent lifted G-action at an arbitrary coadjoint orbit level O. In particular, if Q=Q(H) is of single orbit type we show that the symplectic quotient of T*Q at O can be constructed through a minimal coupling procedure involving the smaller cotangent bundle T*QH, the symplectic quotient of O at 0 with respect to the H-action, and the diagonal Hamiltonian N(H)/H-action on these symplectic spaces. A prescribed connection on QH QH/(N(H)/H) then yields a computationally effective way of explicitly realizing the symplectic structure on each stratum of the symplectic quotient of T*Q. In an example this result is combined with the projection method to produce a stratified Hamiltonian system with very well hidden symmetries.
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