Symmetries of Heterotic String Effective Theory in Three and Two Dimensions

Abstract

The four-dimensional bosonic effective action of the toroidally compactified heterotic string incorporating a dilaton, an axion and one U(1) vector field is studied on curved space-time manifolds with one and two commuting Killing vectors. In the first case the theory is reduced to a three-dimensional sigma model possessing a symmetric pseudoriemannian target space isomorphic to the coset SO(2,3)/(SO(3)× SO(2)). The ten-parameter group SO(2,3) of target space isometries contains embedded both S and T classical duality symmetries of the heterotic string. With one more ignorable coordinate, the theory reduces to a two-dimensional chiral model built on the above coset, and therefore belongs to the class of completely integrable systems. This entails infinite-dimensional symmetries of the Geroch--Kinnersley--Chitre type. Purely dilatonic theory is shown to be two-dimensionally integrable only for two particular values of the dilaton coupling constant. In the static case (diagonal metrics) both theories essentially coincide; in this case the integrability property holds for all values of the dilaton coupling.

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