Duality, Monodromy and Integrability of Two Dimensional String Effective Action
Abstract
The monodromy matrix, M, is constructed for two dimensional tree level string effective action. The pole structure of M is derived using its factorizability property. It is found that the monodromy matrix transforms non-trivially under the non-compact T-duality group, which leaves the effective action invariant and this can be used to construct the monodromy matrix for more complicated backgrounds starting from simpler ones. We construct, explicitly, M for the exactly solvable Nappi-Witten model, both when B=0 and B≠ 0, where these ideas can be directly checked. We consider well known charged black hole solutions in the heterotic string theory which can be generated by T-duality transformations from a spherically symmetric `seed' Schwarzschild solution. We construct the monodromy matrix for the Schwarzschild black hole background of the heterotic string theory.
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