The concept of time travel has always captured the imagination of physicists and laypersons alike. But is it really possible? Of course it is. We're doing it right now, aren't we? We are all traveling into the future one second at a time.
But that was not what you were thinking. Can we travel much further into the future? Absolutely.
If we could travel close to the speed of light, or in the proximity of a black hole, time would slow down enabling us to travel arbitrarily far into the future. The really interesting question is whether we can travel back into the past.
I am a physics professor at the University of Massachusetts, Dartmouth, and first heard about the notion of time travel when I was 7, from a 1980 episode of Carl Sagan's classic TV series, Cosmos.
I decided right then that someday, I was going to pursue a deep study of the theory that underlies such creative and remarkable ideas: Einstein's relativity. Twenty years later, I emerged with a PhD in the field and have been an active researcher in the theory ever since.
Now, one of my doctoral students has just published a paper in the journal Classical and Quantum Gravity that describes how to build a time machine using a very simple construction.
Closed time-like curves
Einstein's general theory of relativity allows for the possibility of warping time to such a high degree that it actually folds upon itself, resulting in a time loop. Imagine you're traveling along this loop; that means that at some point, you'd end up at a moment in the past and begin experiencing the same moments since, all over again – a bit like deja vu, except you wouldn't realize it.
Such constructs are often referred to as "closed time-like curves" or CTCs in the research literature, and popularly referred to as "time machines." Time machines are a byproduct of effective faster-than-light travel schemes and understanding them can improve our understanding of how the universe works.
The general conclusion that has emerged from previous research, including Thorne's and Hawking's, is that nature forbids time loops.
This is perhaps best explained in Hawking's "Chronology Protection Conjecture," which essentially says that nature doesn't allow for changes to its past history, thus sparing us from the paradoxes that can emerge if time travel were possible.
Perhaps the most well-known amongst these paradoxes that emerge due to time travel into the past is the so-called "grandfather paradox" in which a traveler goes back into the past and murders his own grandfather.
This alters the course of history in a way that a contradiction emerges: The traveler was never born and therefore cannot exist.
Depending on the details, different physical phenomena may intervene to prevent closed time-like curves from developing in physical systems. The most common is the requirement for a particular type of "exotic" matter that must be present in order for a time loop to exist.
Loosely speaking, exotic matter is matter that has negative mass. The problem is negative mass is not known to exist in nature.
This new model does not require any negative mass exotic material and offers a very simple design.
Mallary's model consists of two super long cars – built of material that is not exotic, and have positive mass – parked in parallel. One car moves forward rapidly, leaving the other parked. Mallary was able to show that in such a setup, a time loop can be found in the space between the cars.
So can you build this in your backyard?
If you suspect there is a catch, you are correct. Mallary's model requires that the center of each car has infinite density. That means they contain objects – called singularities – with an infinite density, temperature and pressure.
Moreover, unlike singularities that are present in the interior of black holes, which makes them totally inaccessible from the outside, the singularities in Mallary's model are completely bare and observable, and therefore have true physical effects.
Physicists don't expect such peculiar objects to exist in nature either. So, unfortunately a time machine is not going to be available anytime soon.
However, this work shows that physicists may have to refine their ideas about why closed time-like curves are forbidden.