bahamagreen said:Alright, is this a correctly formulated question?
For the light cone of an event coincident with a point on the world line of a mass,
does the curvature continue from within to outside the event's light cone?
If so, is the mass subject to the external curvature?
If not, does the curvature have a discontinuity at the light cone surface?
If this is still incorrect, let me explain what I'm trying to understand... maybe this will reveal an error in my thinking...
GR shifts gravitation from a force with a propagation >>c to an instantaneous curvature ; so I'm wondering if the curvature extends outside an event's light cone. It seems that it must do so. But if it does, then it seems some influence from that curvature outside the event's light cone would be in effect within the light cone. But if it does not extend outside, what does it look like at the boundary of the light cone? Since gravitation is not limited by distance it would not go to zero before the boundary, but would need to extend through it, but if it does not extend through the boundary it must have some magnitude before and at the boundary that is zero beyond the boundary.
I guess what I'm wondering is how gravity as curvature is restricted to influence within event's light cones; gravity as curvature seems like it would exist and be globally influential without regard to light cone boundaries. How does curvature behave so as to not extend influence through boundaries which seem to be arbitrary depending on the local event?
bahamagreen said:I guess what I'm wondering is how gravity as curvature is restricted to influence within event's light cones
No, this is incorrect. Einstein's field equations are not linear so you cannot just make a superposition of different contributions.bahamagreen said:I think what I'm asking is whether curvature at an event is the linear superposition of all sources of contributing curvature (which I think is correct)
The light cones of spatially separated events may intersect and the curvature at those two events may therefore partially depend on the same history.bahamagreen said:Changes in curvature, yes, restricted to the past cone; but the "static" curvature is already here inside and there outside the past light cone isn't it?
The EM analogy to a static gravitational field is the electrostatic field around a charge. You could just as well ask whether the electromagnetic field changes at the surface of the light cone. Generally no, but you could imagine a charge moving inertially then undergoing a sudden acceleration at some event. The electromagnetic field inside the future light cone of that event reflects the new motion, but the field outside does not. It hasn't had time to be aware of the change yet. The same is true of a gravitational field - the field inside the future light cone of some change in the source reflects that change while the field outside does not. So there is a change in curvature across the surface of the light cone of some change of state of the source, but not in general across the surface of the light cone of some randomly chosen event.bahamagreen said:EM is a propagation, so not >c. Gravitational waves (changes in curvature?) also share that same constraint.
The past light cone of any event stretches all the way back to the Big Bang. Only matter that was inside the past light cone of the event can affect the event (through gravity or otherwise), but that includes a truly huge volume, a huge amount of mass, most of which isn't moving very much so generates what you might think of as a "static" curvature. But it would be more accurate to think of it as the joint field of all the matter in the past light cone of the event.bahamagreen said:how the contributors are limited so that the spacetime curvature at that event is determined entirely by what is in the past light cone of that event. Changes in curvature, yes, restricted to the past cone; but the "static" curvature is already here inside and there outside the past light cone isn't it?
bahamagreen said:I'm still mixed up on how curvature is causal if it is not propagated (and only propagated when it changes), if this is true. Doesn't it shape itself locally like a function, without regard to causal propagation because it not changing? Doesn't the global curvature (including outside the observable) determine local curvature? Does curvature only extend as far as the observable universe?
The GR curvature at the light cone surface refers to the bending of light and space-time caused by the presence of massive objects. This phenomenon is described by Einstein's theory of general relativity and is a fundamental aspect of how gravity works.
Yes, the curvature at the light cone surface is smooth. According to general relativity, space-time is a continuous and smooth fabric that can be curved and stretched by the presence of matter and energy. Therefore, the curvature at the light cone surface is also smooth.
Yes, the curvature at the light cone surface can be bent. The amount of bending is determined by the mass and energy of the objects present in space-time. The larger the mass or energy, the greater the curvature and bending of space-time will be.
The curvature at the light cone surface causes the path of light to be bent, which is why we observe gravitational lensing when light passes near massive objects. This bending of light is also responsible for the phenomenon of gravitational redshift, where light is stretched to longer wavelengths as it travels through curved space-time.
Yes, the curvature at the light cone surface can block light. This occurs when the curvature is so strong that it creates a gravitational well, trapping light and preventing it from escaping. This is known as a black hole, where the curvature at the light cone surface is so steep that even light cannot escape its gravitational pull.