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Liouville theory and special coadjoint Virasoro orbits

Abstract

We describe the Hamiltonian reduction of the coajoint Kac-Moody orbits to the Virasoro coajoint orbits explicitly in terms of the Lagrangian approach for the Wess-Zumino-Novikov-Witten theory. While a relation of the coajoint Virasoro orbit Diffβ€…β€ŠS1/SL(2,R)Diff \; S^1 /SL(2,R) to the Liouville theory has been already studied we analyse the role of special coajoint Virasoro orbits Diffβ€…β€ŠS1/T~Β±,nDiff \; S^1/\tilde{T}_{\pm ,n} corresponding to stabilizers generated by the vector fields with double zeros. The orbits with stabilizers with single zeros do not appear in the model. We find an interpretation of zeros xix_i of the vector field of stabilizer T~Β±,n\tilde{T}_{\pm ,n} and additional parameters qiq_i, i=1,...,ni = 1,...,n, in terms of quantum mechanics for nn point particles on the circle. We argue that the special orbits are generated by insertions of "wrong sign" Liouville exponential into the path integral. The additional parmeters qiq_i are naturally interpreted as accessory parameters for the uniformization map. Summing up the contributions of the special Virasoro orbits we get the integrable sinh-Gordon type theory.Comment: preprint ITEP-67-1993,16 p.,Latex fil

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    Last time updated on 05/06/2019