Disclaimer: this post quickly becomes quite technical, but it could give some extra STR
intuition to those brave enough to stick with it.
I'll try to explain
relativity geometrically. This is actually a very common approach, because space and
time themselves are best understood geometrically. As discussed in the 'introduction', these notions are
intricately related to our experience:
our perceptions tell us that things can be in different places and can happen
at different moments, the collection of which we call space-time. Very often,
the need arises to quantify the places and moments in order for us to, you know, function
as humans and as a society. In our day-to-day lives, we go about this in an informal way, choosing just the right amount of vagueness that is needed for particular situation.
The formal (i.e. boring?), scientific way to describe positions is to use a system of coordinates, and the most commonly used one is Cartesian coordinates,
introduced, just like the evil demon, by René Descartes. In two
dimensions, these look in this probably familiar way:
What I mean by two dimensions is that the space described by the example above (e.g. the plane of your monitor) is such that any location
can be precisely pinpointed by two numbers. These could be the x- and
y-positions in the Cartesian frame above, but the concept of
dimensionality is much more general. In fact, we are intuitively used to a very complex two-dimensional space, since we are tied by gravity to the surface of the Earth [1]. This surface has an extremely complicated shape, which the x-y plane above cannot capture well, but it is still two-dimensional, in the sense that any location can be uniquely defined by two
numbers, as anybody who's used GPS coordinates knows. So 3D beings as we are, we do anyway spend our lives tied down to what is, to a good approximation, a 2D world.
The Cartesian coordinate
system seems very natural. Right angles make sense. Well, I don’t know if it is a priori aesthetic - in fact I think that a priori aesthetic is an oxymoron - but we humans definitely seem to like it a lot. We even like to organize our cities in this way. There's not much difference between saying '42nd and 5th' and saying 'at x = 3.2, y = 2', or something.
Now, to illustrate
relativity, we're going to decrease the spatial dimensions to one. That means that we’re only going to keep the x-axis. It also means that anything
living in this toy 1D world can only be in front or behind anything else. The reason for this simplification is
because we want to use the other axis to represent time:
This is now a graphical
representation of space-time, and already hints at the fact that those are
kinda like different aspects of the same thing. Note that we always had some intuition that time is very similar to space, or in any case certainly before Einstein or
Descartes. This can be seen in our language. Interestingly, there are different ways in which different cultures view time. What is practically ubiquitous among cultures, however, is the fact that the words we use to speak about time are very similar to the ones we use for space: there is a conceptual metaphor of time as a path through space. The examples are numerous. Plenty of time ahead of us. At 8am. In French one even says, 'le moment où quelque chose s'est passé', which literally means 'the moment where something happened.'
An important remark is due. The space-time reference frame shown above is neither unique nor absolute. It is in fact observer-dependent, so
you should think of everyone as having one of those attached to them.
The Universe itself
consists of events which are absolute
in the sense I discussed here: all observers agree on them happening, but, to do that, every observer relies on their own reference frame. This is what this looks like.
This way of talking about
events by naming both their spatial and temporal position is perhaps a bit awkward, but
you’d better get used to it if you want to understand relativity. Space-time
should always be thought of as indivisible.
The example above, where two
observers at a different place compare their observations of an event is fairly
straightforward to understand. It's also possible to compare reference frames at different times. This is slightly less intuitive, but still nothing too complicated.
The two reference frames
above correspond to two observers moving with respect to one another, which at t = 0, x = 0 (in both frames) find themselves at the same time and place. This is a graphical representation of what is known as a Galilean transformation. The fact that the time axis tilts while the space axis doesn't is
deeply connected to our (wrong) understanding of time as something that is
absolute for everybody. Consider this. If we have two events which happen at
the same time with respect to observer one, then they also happen at the same
time for observer two.
This shared simultaneity of events means that we can come up with a common time-counting scheme for the two observers, such that t = t' for all events. This would represent the absolute-ness of time. However, if two events happen at the same place for observer one, they don’t
happen at the same place for the second guy: space is relative.
To see what the situation
looks like in relativistic physics, let’s first take care of a small
technicality. In measuring and plotting x and t, we have to choose some units. We actually have some freedom in that, and the units we choose affect the scale
of the axes. Let’s say we take the standard choice of measuring time in
seconds. A standard choice for measuring positions is the metre, unless you have the misfortune to come from one of the three countries in the world where it isn't. For the
purposes of relativity, however, it is particularly convenient to choose a different
unit: the light-second. This is analogous to the light-year (which we would use if we chose to measure time in years instead of seconds) in that
it’s defined as the distance that light travels for one second. With this choice of units, the
reference frames for observers moving with respect to one another turn out to look like this:
With this in mind, we can see where all the 'weird' stuff in relativity comes from. For example, simultaneity can no longer be defined in an absolute (i.e. observer-independent) way.
Events that happen at the same time for one observer can happen at different
times for another one:
The title of this post comes from a famous quote by the Doctor, namely, 'People assume that time is a strict progression of cause to effect, but actually from a non-linear, non-subjective viewpoint - it's more like a big ball of wibbly-wobbly timey-wimey... stuff.' One thing that Einsten always insisted upon, however, was kinda the opposite: the absolute nature of causality. In other words, he did subscribe to the assumption that the Doctor claims is wrong: the idea that cause always precedes effect. This is what is known as causality, and is usually held as a fundamental principle of nature. An illustration from everyday language is when we say that you cannot eat your cake and have it whole; this is because the cause - eating the cake - results in the effect - you no longer having it whole. Einstein made it clear that although some funky things happen according to STR, nothing as funky as eating a cake and having it whole can ever happen, in any reference frame. Pictorially, this looks like this.
The enthusiasm has by now somewhat died out, though. Even though we cannot prove them impossible, most physicists don't consider the existence of tachyons very likely. More precisely, the possibility to observe these particles even if they do exist is considered unlikely, which is practically an equivalent statement. That's some food for thought for you: in terms of physics, is there any difference between something not existing, and something existing but not interacting with us?
Einstein would have agreed that tachyons cannot be a part of our world. Basically, interacting with such particles would immediately break causality and result in a ton of paradoxes of the kill-your-grandfather type (and the even more disturbing Futurama version). Again, this is technically not a proof of the impossibility of backwards-in-time travel. But, while strictly speaking nothing can be proven impossible, some things just look mighty improbable. In any case, Einsten considered the cause-and-effect realtionship a fundamental principle of nature, and its breaking - impossible. In fact he was much more concerned with that than with determinism, despite his famous 'God does not play dice' quote. And I must say that once again I find it easy to agree with the great man. I would say that it is, in fact, safe to assume that time is a strict progression of cause to effect, at least until we have seen even the tiniest reason to think otherwise. Which, right now, we haven't.
Bottom line, while Einstein's theory does illustrate that time is wibbly-wobbly (i.e. not absolute), I don't think he would've been much of a fan of the Doctor's dismissal of causality.
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