Mass without Matter?

Question

My cursory studies of general relativity had introduced me to the concept of how gravity is associated with the warping of spacetime and that the presence of matter in space warps space and this warping is observed as gravity. And this left me with the belief that you have to have matter to have mass and thus gravity. And only when you have matter do you have mass.

But now I'm reading Kip Thorne's The Science of Interstellar, and in Thorne's description of black holes he says".. matter as we know it gets stretched and squeezed out of existence." and "all that is left is warped space and time"

So according to Thorne (and others) black holes contain no matter, yet they have mass and exert gravitational forces. So my initial belief must therefore be wrong.

How can mass exist without matter?

Black holes are created from collapsing stars that once contained very large quantities of matter. Through the process of collapse and formation of the black hole, mass is conserved, but matter is not? Where did the matter go?

Answer 1

Treating only

How can mass exist without matter?

and not the context, it is important to understand the usual relativistic definition of mass as the norm of the energy-momentum four-vector $$ \left( m c^2 \right)^2 = \left|\mathbf{p}\right|^2 = E^2 - \vec{p}^2 c^2\,.$$

In this context any system of photons not all pointing in the same direction has mass without having any "matter" in a conventional understanding.

Answer 2

"..matter as we know it gets stretched and squeezed out of existence." and "all that is left is warped space and time"

As you can't observe anything inside Event Horizon of a Black Hole, it can be seen as the matter goes out of existence as it can't be located in our Spacetime. That's it.

Answer 3

I think Kip Thorne is actually talking about something about which there is no wide scientific consensus.

When a star collapses into a black hole, what remains is a complete vacuum with a single singular point (a singular hoop in the case of a spinning star). The singular point or hoop is a point where the equations break down - from a strict methodological viewpoint it should not be considered a part of the space-time. But it is this very point where all the matter was before the final stages of the collapse and where some physicists would say "all the matter was squeezed into".

Mathematical physicists call these space-times "vacuum space-times" because they are solutions to vacuum Einstein equations and the warping around such singular points is supplied by a set of boundary conditions. I.e., the space-time ends at the singular point inside the black hole and you only impose the warping of the space-time in an infinitely close neighborhood and at infinity. Just by imposing these conditions you recover the complete structure of the black hole.

You are faced with three possibilities of handling this squeeze-out of matter. First, you can say that all the matter is squeezed into the singular point. Second, you say that the point is actually a singular hole in the space-time pinched in there by a collapse of matter and that the matter was, indeed, squeezed out of existence. And third, you say that the laws are actually slightly different, so that this singular squeeze-out never happens in reality and is only an artefact of extending a set of effective laws beyond their range of applicability.

The first two possibilities actually bear the same physical implications for the surrounding warped space-time, so physicists do not really make a distinction between them. However, the most widely accepted possibility is the third one, and the theory which should prevent the singular squeeze-out is supposed to be quantum gravity.

Answer 4

Mass is not a conserved quantity, as special relativity has taught us. What is conserved is energy, and that is how we get energy out of nuclear reactors. General relativity goes further by postulating that space time itself creates the format of matter and energy,

At its core are Einstein's equations, which describe the relation between the geometry of a four-dimensional, pseudo-Riemannian manifold representing spacetime, and the energy–momentum contained in that spacetime. Phenomena that in classical mechanics are ascribed to the action of the force of gravity (such as free-fall, orbital motion, and spacecraft trajectories), correspond to inertial motion within a curved geometry of spacetime in general relativity; there is no gravitational force deflecting objects from their natural, straight paths. Instead, gravity corresponds to changes in the properties of space and time, which in turn changes the straightest-possible paths that objects will naturally follow. The curvature is, in turn, caused by the energy–momentum of matter. Paraphrasing the relativist John Archibald Wheeler, spacetime tells matter how to move; matter tells spacetime how to curve.

So it is not a simple matter. ;)

Answer 5

The common experiences attributed to gravity are simply the effects of a curved spacetime. Spacetime curvature can persist and propagate even in regions far from any mass or matter.

What mass (or more generally, energy density, momentum density, and stress) does is change how curvature at one time is related to the curvature before and nearby to be different than it otherwise would be.

An analogy would be electromagnatism. Electromagnetic fields can exist, persist, and propagate far from any charges, but charges allow the relationships between fields at different points in spacetime to be different than would otherwise be allowed. In fact, based on the relationships between the fields we can find out what net charges are around.

Similarly for curvature, give the metric, we can compute the Einstein tensor based on the changes in the metric (in space and time). From that we can find out whether there is net energy, momentum or stress in a region.

OK. So that's how mass and matter is related to spacetime (they can cause energy density, momentum density, and stress). But if you are far from any such sources, you don't know what (if anything) is causing that curvature, because that curvature is simply caused by earlier and nearby curvature.

Going back to our analogy with electromagnetism, it's like if you saw an electromagnetic wave zip by. It probably was caused by some charges in the past. But the equations themselves can't tell you that, if it has just been zipping around the universe forever, then it will continue until some charge or current somewhere makes it propagate different.

So when you notice a curved spacetime you can compute the metric and then the Einstein tensor and see whether it is zero, or whether it is electrovacuum or whether it is something else not corresponding to mass or matter. But that doesn't tell you whether there is mass or matter elsewhere else in the past that is responsible in some way for what you see in the here and now. There might be, there might not be. If what you see is an electromagnetic wave, then the analogy is strong in this example, and it cold have been caused by some stress, momentum, or energy in the past, or maybe it's always been zipping around. And looking at the curvature out here in the now doesn't and won't tell us that.

An extreme case of ignorance would be a stationary, static, spherically symmetric spacetime in a shell like region of vacuum. We can't tell from the solution in the shell whether it is from a black hole or from some matter. In the case of a black hole, we don't know what is on the inside, only the curvature on the outside. And something left on the outside in the vacuum must be the kind of curvature that propagates itself through the vacuum. Which is the kind that doesn't need mass or matter (to propagate or persist, though maybe it interacted with mass or matter in the past or elsewhere)

There was a research program called "mass without mass" by Wheeler that looked at solutions that from far away and long periods of time looked like there was some mass or matter in there, but didn't have any.

Answer 6

mass is a part of more broad quantity stress energy tensor.and stress energy tensor $Tμν$ can be derived from varying the action with respect to metric(which defines spacetime) . $$T_{\mu\nu}:= \frac{-2}{\sqrt{-g}}\frac{\delta (\sqrt{-g} \mathcal{L}_\mathrm{M})}{\delta g^{\mu\nu}} = -2 \frac{\delta \mathcal{L}_\mathrm{M}}{\delta g^{\mu\nu}} + g_{\mu\nu} \mathcal{L}_\mathrm{M}.$$ so the main entity is metric.so it is correct to say that matter as we know it gets stretched and squeezed out of existence." and "all that is left is warped space and time.

in many other places also we derive $T_{\mu \nu}$ by varying the action.more you can read anywhere.

Answer 7

W+- and Z weak bosons have big masses and are no matter.