Solution space of 2+1 gravity on R × T2 in Witten's connection formulation

Abstract

We investigate the space M of classical solutions to Witten's formulation of 2+1 gravity on the manifold R × T2. M is connected, unlike the spaces of classical solutions in the cases where T2 is replaced by a higher genus surface. Although M is neither Hausdorff nor a manifold, removing from M a set of measure zero yields a manifold which is naturally viewed as the cotangent bundle over a non-Hausdorff base space~ B. We discuss the relation of the various parts of M to spacetime metrics, and various possibilities of quantizing~ M. There exist quantizations in which the exponentials of certain momentum operators, when operating on states whose support is entirely on the part of B corresponding to conventional spacetime metrics, give states whose support is entirely outside this part of~ B. Similar results hold when the gauge group SO0(2,1) is replaced by SU(1,1).

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