Many
physicists believe that entanglement is the essence of quantum
weirdness — and some now suspect that it may also be the essence of
space-time geometry.
Warner Bros. Entertainment/Paramount Pictures
Black holes such as the one depicted in Interstellar (2014) can be connected by wormholes, which might have quantum origins.
Black holes such as the one depicted in Interstellar (2014) can be connected by wormholes, which might have quantum origins.
In early 2009, determined to make the
most of his first sabbatical from teaching, Mark Van Raamsdonk decided
to tackle one of the deepest mysteries in physics: the relationship
between quantum mechanics and gravity. After a year of work and
consultation with colleagues, he submitted a paper on the topic to the Journal of High Energy Physics.
In April 2010, the journal sent him a
rejection — with a referee’s report implying that Van Raamsdonk, a
physicist at the University of British Columbia in Vancouver, was a
crackpot.
His next submission, to General Relativity and Gravitation, fared little better: the referee’s report was scathing, and the journal’s editor asked for a complete rewrite.
But by then, Van Raamsdonk had entered a
shorter version of the paper into a prestigious annual essay contest run
by the Gravity Research Foundation in Wellesley, Massachusetts. Not
only did he win first prize, but he also got to savour a particularly
satisfying irony: the honour included guaranteed publication in General Relativity and Gravitation. The journal published the shorter essay1 in June 2010.
Still, the editors had good reason to be
cautious. A successful unification of quantum mechanics and gravity has
eluded physicists for nearly a century. Quantum mechanics governs the
world of the small — the weird realm in which an atom or particle can be
in many places at the same time, and can simultaneously spin both
clockwise and anticlockwise. Gravity governs the Universe at large —
from the fall of an apple to the motion of planets, stars and galaxies —
and is described by Albert Einstein’s general theory of relativity,
announced 100 years ago this month. The theory holds that gravity is
geometry: particles are deflected when they pass near a massive object
not because they feel a force, said Einstein, but because space and time
around the object are curved.
Both theories have been abundantly
verified through experiment, yet the realities they describe seem
utterly incompatible. And from the editors’ standpoint, Van Raamsdonk’s
approach to resolving this incompatibility was strange. All that’s
needed, he asserted, is ‘entanglement’: the phenomenon that many
physicists believe to be the ultimate in quantum weirdness. Entanglement
lets the measurement of one particle instantaneously determine the
state of a partner particle, no matter how far away it may be — even on
the other side of the Milky Way.
Einstein loathed the idea of entanglement, and famously derided it as “spooky action at a distance”. But it is central to quantum theory.
And Van Raamsdonk, drawing on work by like-minded physicists going back
more than a decade, argued for the ultimate irony — that, despite
Einstein’s objections, entanglement might be the basis of geometry, and
thus of Einstein’s geometric theory of gravity. “Space-time,” he says,
“is just a geometrical picture of how stuff in the quantum system is
entangled.”
Space-time, is just a geometrical picture of how stuff in the quantum system is entangled
This idea is a long way from being
proved, and is hardly a complete theory of quantum gravity. But
independent studies have reached much the same conclusion, drawing
intense interest from major theorists. A small industry of physicists is
now working to expand the geometry–entanglement relationship, using all
the modern tools developed for quantum computing and quantum
information theory.
“I would not hesitate for a minute,” says
physicist Bartłomiej Czech of Stanford University in California, “to
call the connections between quantum theory and gravity that have
emerged in the last ten years revolutionary.”
Gravity without gravity
Much of this work rests on a discovery2 announced
in 1997 by physicist Juan Maldacena, now at the Institute for Advanced
Study in Princeton, New Jersey. Maldacena’s research had led him to
consider the relationship between two seemingly different model
universes. One is a cosmos similar to our own. Although it neither
expands nor contracts, it has three dimensions, is filled with quantum
particles and obeys Einstein’s equations of gravity. Known as anti-de
Sitter space (AdS), it is commonly referred to as the bulk. The other
model is also filled with elementary particles, but it has one dimension
fewer and doesn’t recognize gravity. Commonly known as the boundary, it
is a mathematically defined membrane that lies an infinite distance
from any given point in the bulk, yet completely encloses it, much like
the 2D surface of a balloon enclosing a 3D volume of air. The boundary
particles obey the equations of a quantum system known as conformal
field theory (CFT).
Maldacena discovered that the boundary
and the bulk are completely equivalent. Like the 2D circuitry of a
computer chip that encodes the 3D imagery of a computer game, the
relatively simple, gravity-free equations that prevail on the boundary
contain the same information and describe the same physics as the more
complex equations that rule the bulk.
“It’s kind of a miraculous thing,” says
Van Raamsdonk. Suddenly, he says, Maldacena’s duality gave physicists a
way to think about quantum gravity in the bulk without thinking about
gravity at all: they just had to look at the equivalent quantum state on
the boundary. And in the years since, so many have rushed to explore
this idea that Maldacena’s paper is now one of the most highly cited
articles in physics.
Among the enthusiasts was Van Raamsdonk,
who started his sabbatical by pondering one of the central unsolved
questions posed by Maldacena’s discovery: exactly how does a quantum
field on the boundary produce gravity in the bulk? There had already
been hints3 that
the answer might involve some sort of relation between geometry and
entanglement. But it was unclear how significant these hints were: all
the earlier work on this idea had dealt with special cases, such as a
bulk universe that contained a black hole. So Van Raamsdonk decided to
settle the matter, and work out whether the relationship was true in
general, or was just a mathematical oddity.
He first considered an empty bulk
universe, which corresponded to a single quantum field on the boundary.
This field, and the quantum relationships that tied various parts of it
together, contained the only entanglement in the system. But now, Van
Raamsdonk wondered, what would happen to the bulk universe if that
boundary entanglement were removed?
He was able to answer that question using mathematical tools4 introduced
in 2006 by Shinsei Ryu, now at the University of Illinois at
Urbana–Champaign, and Tadashi Takanagi, now at the Yukawa Institute for
Theoretical Physics at Kyoto University in Japan. Their equations
allowed him to model a slow and methodical reduction in the boundary
field’s entanglement, and to watch the response in the bulk, where he
saw space-time steadily elongating and pulling apart (see ‘The entanglement connection’).
Ultimately, he found, reducing the entanglement to zero would break the
space-time into disjointed chunks, like chewing gum stretched too far.
NIK SPENCER/NATURE
The geometry–entanglement relationship
was general, Van Raamsdonk realized. Entanglement is the essential
ingredient that knits space-time together into a smooth whole — not just
in exotic cases with black holes, but always.
“I felt that I had understood something
about a fundamental question that perhaps nobody had understood before,”
he recalls: “Essentially, what is space-time?”
Entanglement and Einstein
Quantum entanglement as geometric glue —
this was the essence of Van Raamsdonk’s rejected paper and winning
essay, and an idea that has increasingly resonated among physicists. No
one has yet found a rigorous proof, so the idea still ranks as a
conjecture. But many independent lines of reasoning support it.
In 2013, for example, Maldacena and Leonard Susskind of Stanford published5 a
related conjecture that they dubbed ER = EPR, in honour of two landmark
papers from 1935. ER, by Einstein and American-Israeli physicist Nathan
Rosen, introduced6 what
is now called a wormhole: a tunnel through space-time connecting two
black holes. (No real particle could actually travel through such a
wormhole, science-fiction films notwithstanding: that would require
moving faster than light, which is impossible.) EPR, by Einstein, Rosen
and American physicist Boris Podolsky, was the first paper to clearly
articulate what is now called entanglement7.
Maldacena and Susskind’s conjecture was
that these two concepts are related by more than a common publication
date. If any two particles are connected by entanglement, the physicists
suggested, then they are effectively joined by a wormhole. And vice
versa: the connection that physicists call a wormhole is equivalent to
entanglement. They are different ways of describing the same underlying
reality.
No one has a clear idea of what this
underlying reality is. But physicists are increasingly convinced that
it must exist. Maldacena, Susskind and others have been testing the
ER = EPR hypothesis to see if it is mathematically consistent with
everything else that is known about entanglement and wormholes — and so
far, the answer is yes.
Hidden connections
Other lines of support for the
geometry–entanglement relationship have come from condensed-matter
physics and quantum information theory: fields in which entanglement
already plays a central part. This has allowed researchers from these
disciplines to attack quantum gravity with a whole array of fresh
concepts and mathematical tools.
Tensor networks, for example, are a
technique developed by condensed-matter physicists to track the quantum
states of huge numbers of subatomic particles. Brian Swingle was using
them in this way in 2007, when he was a graduate student at the
Massachusetts Institute of Technology (MIT) in Cambridge, calculating
how groups of electrons interact in a solid material. He found that the
most useful network for this purpose started by linking adjacent pairs
of electrons, which are most likely to interact with each other, then
linking larger and larger groups in a pattern that resembled the
hierarchy of a family tree. But then, during a course in quantum field
theory, Swingle learned about Maldacena’s bulk–boundary correspondence
and noticed an intriguing pattern: the mapping between the bulk and the
boundary showed exactly the same tree-like network.
Swingle wondered whether this resemblance might be more than just coincidence. And in 2012, he published8 calculations
showing that it was: he had independently reached much the same
conclusion as Van Raamsdonk, thereby adding strong support to the
geometry–entanglement idea. “You can think of space as being built from
entanglement in this very precise way using the tensors,” says Swingle,
who is now at Stanford and has seen tensor networks become a frequently
used tool to explore the geometry–entanglement correspondence.
Another prime example of
cross-fertilization is the theory of quantum error-correcting codes,
which physicists invented to aid the construction of quantum computers.
These machines encode information not in bits but in ‘qubits’: quantum
states, such as the up or down spin of an electron, that can take on
values of 1 and 0 simultaneously. In principle, when the qubits interact
and become entangled in the right way, such a device could perform
calculations that an ordinary computer could not finish in the lifetime
of the Universe. But in practice, the process can be incredibly fragile:
the slightest disturbance from the outside world will disrupt the
qubits’ delicate entanglement and destroy any possibility of quantum
computation.
That need inspired quantum
error-correcting codes, numerical strategies that repair corrupted
correlations between the qubits and make the computation more robust.
One hallmark of these codes is that they are always ‘non-local’: the
information needed to restore any given qubit has to be spread out over a
wide region of space. Otherwise, damage in a single spot could destroy
any hope of recovery. And that non-locality, in turn, accounts for the
fascination that many quantum information theorists feel when they first
encounter Maldacena’s bulk–boundary correspondence: it shows a very
similar kind of non-locality. The information that corresponds to a
small region of the bulk is spread over a vast region of the boundary.
“Anyone could look at AdS–CFT and say
that it’s sort of vaguely analogous to a quantum error-correcting code,”
says Scott Aaronson, a computer scientist at MIT. But in work published
in June9,
physicists led by Daniel Harlow at Harvard University in Cambridge and
John Preskill of the California Institute of Technology in Pasadena
argue for something stronger: that the Maldacena duality is itself a
quantum error-correcting code. They have demonstrated that this is
mathematically correct in a simple model, and are now trying to show
that the assertion holds more generally.
“People have been saying for years that
entanglement is somehow important for the emergence of the bulk,” says
Harlow. “But for the first time, I think we are really getting a glimpse
of how and why.”
Beyond entanglement
That prospect seems to be enticing for
the Simons Foundation, a philanthropic organization in New York City
that announced in August that it would provide US$2.5 million per year
for at least 4 years to help researchers to move forward on the
gravity–quantum information connection. “Information theory provides a
powerful way to structure our thinking about fundamental physics,” says
Patrick Hayden, the Stanford physicist who is directing the programme.
He adds that the Simons sponsorship will support 16 main researchers at
14 institutions worldwide, along with students, postdocs and a series of
workshops and schools. Ultimately, one major goal is to build up a
comprehensive dictionary for translating geometric concepts into quantum
language, and vice versa. This will hopefully help physicists to find
their way to the complete theory of quantum gravity.
Still, researchers face several
challenges. One is that the bulk–boundary correspondence does not apply
in our Universe, which is neither static nor bounded; it is expanding
and apparently infinite. Most researchers in the field do think that
calculations using Maldacena’s correspondence are telling them something
true about the real Universe, but there is little agreement as yet on
exactly how to translate results from one regime to the other.
Another challenge is that the standard
definition of entanglement refers to particles only at a given moment. A
complete theory of quantum gravity will have to add time to that
picture. “Entanglement is a big piece of the story, but it’s not the
whole story,” says Susskind.
He thinks physicists may have to embrace another concept from quantum information theory: computational complexity,
the number of logical steps, or operations, needed to construct the
quantum state of a system. A system with low complexity is analogous to a
quantum computer with almost all the qubits on zero: it is easy to
define and to build. One with high complexity is analogous to a set of
qubits encoding a number that would take aeons to compute.
Susskind began to think about
computational complexity about a decade ago, when he noticed that a
solution to Einstein’s equations of general relativity allowed a
wormhole in AdS space to get longer and longer as time went on. What did
that correspond to on the boundary, he wondered? What was changing
there? Susskind knew that it couldn’t be entanglement, because the
correlations that produce entanglement between different particles on
the boundary reach their maximum in less than a second10. In an article last year11,
however, he and Douglas Stanford, now at the Institute for Advanced
Study, showed that as time progressed, the quantum state on the boundary
would vary in exactly the way expected from computational complexity.
“It appears more and more that the growth
of the interior of a black hole is exactly the growth of computational
complexity,” says Susskind. If quantum entanglement knits together
pieces of space, he says, then computational complexity may drive the
growth of space — and thus bring in the elusive element of time. One
potential consequence, which he is just beginning to explore, could be a
link between the growth of computational complexity and the expansion
of the Universe. Another is that, because the insides of black holes are
the very regions where quantum gravity is thought to dominate,
computational complexity may have a key role in a complete theory of
quantum gravity.
Despite the remaining challenges, there
is a sense among the practitioners of this field that they have begun to
glimpse something real and very important. “I didn’t know what space
was made of before,” says Swingle. “It wasn’t clear that question even
had meaning.” But now, he says, it is becoming increasingly apparent
that the question does make sense. “And the answer is something that we
understand,” says Swingle. “It’s made of entanglement.”
As for Van Raamsdonk, he has written some
20 papers on quantum entanglement since 2009. All of them, he says,
have been accepted for publication.
Ron Cowen
- Nature 527, 290–293 (19 November 2015) doi:10.1038/527290a
-
…For references, related articles and more information it is strongly recommended to read the original post at nature.com
Δεν υπάρχουν σχόλια :
Δημοσίευση σχολίου