Well, since there seems to be no commonly accepted definition of the singularity concept (only of singular spacetime), it is at the very least hard to say. It might not depend on the topology but it might be incompatible with it, just the same way a manifold won't admit certain metrics incompatible with its manifold topology.micromass said:Third, Singular points on a manifold are not a concept depending on the topology.
George Jones said:Because the idea is so attractive, over the decades, there have been a number of attempts to define spacetime singularities as missing points or adjoined boundaries, but many (all?) have had various problems.
The work of Susan Scott and collaborators has possibly shown the most promise, but I know very little about this stuff. An interesting recent paper:
http://iopscience.iop.org/0264-9381/28/16/165003/
Unfortunately, at this link, the paper is behind a paywall, and I can't find it on the arXiv. I have access to it, but I haven't a chance to look at it yet.
I didn't look back to see if he actually did (I doubt he did though) but yes it depends on the author. Some authors take Hausdorff as one of the conditions for a topological space to be a manifold and others don't. In the context of space - times if you want physically relevant ones you would probably include the condition.TrickyDicky said:micromass, this is just a technical note that I really don't think adds much to the main discussion and I have no interest whatsoever in arguing about it but just for the record and since you have insisted on it several times...
You have said repeatedly that the Hausdorff condition is already required for topological manifolds...
TrickyDicky said:micromass, this is just a technical note that I really don't think adds much to the main discussion and I have no interest whatsoever in arguing about it but just for the record and since you have insisted on it several times...
You have said repeatedly that the Hausdorff condition is already required for topological manifolds, well I'm not the only one here that has pointed out that the reference text for this stuff, the 1973 book by Ellis and Hawking cites a few examples of topological manifolds that are not Hausdorff.
Besides, I've consulted several standard texts on differential geometry and they also name the Hausdorff condition only when defining smooth/differentiable manifolds.
This is my original cause of confusion that began the discussion, still in the other thread. This happens for the metric tensor, the energy-momentum tensor, the Riemann tensor, etc.TrickyDicky said:My confusion comes from not seeing how an structure that is supposed to act only locally can have global effects.
kevinferreira said:This is my original cause of confusion that began the discussion, still in the other thread. This happens for the metric tensor, the energy-momentum tensor, the Riemann tensor, etc.