ENERGY THEOREM FOR (2+1)-DIMENSIONAL GRAVITY

We prove a positive energy theorem in (2 + 1)-dimensional gravity for open universes and any matter energy-momentum tenser satisfying the dominant energy condition. We consider on the space-like initial value surface a family of widening Wilson loops and show that the energy-momentum of the enclosed subsystem is a future directed time-like vector whose mass is an increasing function of the loop, until it reaches the value 1/4G corresponding to a deficit angle of 2 pi. At this point the energy-momentum of the system evolves, depending on the nature of a zero norm vector appearing in the evolution equations, either into a time-like vector of a universe which closes kinematically or into a Gott-like universe whose energy momentum vector, as first recognized by Deser, Jackiw, and 't Hooft is space-like. This treatment generalizes results obtained by Carroll, Fahri, Guth, and Olum for a system of point-like spinless particle, to the most general form of matter whose energy-momentum tensor satisfies the dominant energy condition. The treatment is also given for the anti-de Sitter (2+1)-dimensional gravity. (C) 1995 Academic Press, Inc.