General Covariance and Free Fields in Two Dimensions
Abstract
We investigate the canonical equivalence of a matter-coupled 2D dilaton gravity theory defined by the action functional S = ∫ d2x -g (Rφ + V(φ) - 1/2 H(φ ) (∇f)2), and a free field theory. When the scalar field f is minimally coupled to the metric field(H(φ)=1) the theory is equivalent, up to a boundary contribution,to a theory of three free scalar fields with indefinite kinetic terms, irrespective of the particular form of the potential V(φ). If the potential is an exponential function of the dilaton one recovers a generalized form of the classical canonical transformation of Liouville theory. When f is a dilaton coupled scalar (H(φ)=φ) and the potential is an arbitrary power of the dilaton the theory is also canonically equivalent to a theory of three free fields with a Minkowskian target space. In the simplest case (V(φ)=0) we provide an explicit free field realization of the Einstein-Rosen midisuperspace. The Virasoro anomaly and the consistence of the Dirac operator quantization play a central role in our approach.
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