On the Dynamics of Finite-Gap Solutions in Classical String Theory

Abstract

We study the dynamics of finite-gap solutions in classical string theory on R x S3. Each solution is characterised by a spectral curve, , of genus g and a divisor, γ, of degree g on the curve. We present a complete reconstruction of the general solution and identify the corresponding moduli-space, M(2g)R, as a real symplectic manifold of dimension 2g. The dynamics of the general solution is shown to be equivalent to a specific Hamiltonian integrable system with phase-space M(2g)R. The resulting description resembles the free motion of a rigid string on the Jacobian torus J(). Interestingly, the canonically-normalised action variables of the integrable system are identified with certain filling fractions which play an important role in the context of the AdS/CFT correspondence.

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