On the differentiability conditions at spacelike infinity

Abstract

We consider space-times which are asymptotically flat at spacelike infinity, i0. It is well known that, in general, one cannot have a smooth differentiable structure at i0, but have to use direction dependent structures. Instead of the oftenly used C>1-differentiabel structure, we suggest a weaker differential structure, a C1+ structure. The reason for this is that we have not seen any completions of the Schwarzschild space-time which is C>1 in both spacelike and null directions at i0. In a C1+ structure all directions can be treated equal, at the expense of logarithmic singularities at i0. We show that, in general, the relevant part of the curvature tensor, the Weyl part, is free from these singularities, and that the (rescaled) Weyl tensor has a certain symmetry.

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