Speed of Quantum Teleportation? [duplicate]

Question

Is Quantum Teleportation limited by distance/time/speed?

In the classical world, the travel of information is limited by the speed of light. So I'm wondering: is there a time delay if we send information with Quantum Teleportation?

Answer 1

Quantum teleportation requires sending classical information. So you can't do it faster than the speed of light.

Quantum Teleportation (simplified)

Alice and Bob have a pair of qubits, $A$ and $B$. $A$ and $B$ are entangled so that:

• If you measure $A$ along the X axis and also measure $B$ along the X axis, the answer will be the same.
• If you measure $A$ along the Z axis and also measure $B$ along the Z axis, the answer will be the same.

In other words, their X-parity is SAME and their Z-parity is also SAME.

Alice wants to give Bob a qubit $Q$. To do this she will compare $Q$ to $A$ along the X and Z axes, then tell Bob how the comparison went. Because $A$ and $B$ were SAME along those axes, she ends up telling Bob how to change $B$ to get $Q$.

Alice starts by measuring the X-parity of $Q$ and $A$. She finds out if they are SAME-X or DIFFERENT-X. Because $A$ and $B$ agreed along the X axis, she's actually finding out if $B$ and $Q$ agree along the X axis. If they're different-X, she yells out "HEY BOB! THE X-PARITY IS WRONG. FLIP $B$ OVER TO FIX THAT!". If $A$ and $Q$ agree along the X axis, she instead yells "X AXIS OKAY!".

Then Alice does the same thing with the Z-parity. She compares $Q$ and $A$ along the Z axis, which is actually telling her whether $B$ agrees or disagrees with $Q$ along Z. If they differ, she yells out "BOB! THE Z-PARITY IS WRONG. FLIP $B$ OVER THE OTHER WAY TO FIX THAT!". Otherwise she yells out "Z AXIS OKAY!".

After Bob hears both of Alice's yells, and has fixed any wrong parities, $B$'s state has been overwritten with $Q$'s original state. It's literally the quantum equivalent of a one-time pad cipher. (Well, except that $Q$ and $A$ get totally trashed by the measurements that Alice did.)

Notice that the process required yelling. Bob had to be told which corrections to apply. That's why quantum teleportation can't be done faster than light speed. Yells don't move faster than light.

Answer 2

There is no faster than light communication or motion in quantum mechanics. Teleportation does not feature any faster than light information transfer. This is a misunderstanding that is common even among physicists.

In classical physics, a system can be described by a set of numbers whose values can all be measured using a single instance of that system. There is a mathematical result called Bell's theorem saying that no local theory can reproduce the predictions of quantum mechanics using classical physics. Quantum mechanics is not classical physics and so it is not surprising that they give rise to different predictions.

In quantum mechanics, a system is characterised by the values of observables where those values are represented by mathematical objects called Hermitian matrices. To describe how information is transferred between quantum systems you have to describe the ways in which the observables of one system depend on those of another. In general, an observable does not represent just a single valued measurable quantity changing over time. Rather, it represents a more complex structure that involves multiple different versions of that quantity interfering with one another. And if there are going to be multiple versions of each system, then any given system has to carry information about how a particular version of that system will interact with a particular version of another system. In general, you can't get that sort of information by measuring just one system and for that reason it is called locally inaccessible information. An explanation of how locally inaccessible information gives rise to EPR correlations, teleportation etc by entirely local interactions is given here:

http://arxiv.org/abs/quant-ph/9906007.

See also

http://arxiv.org/abs/1109.6223.

For popular treatments see "The Fabric of Reality" and "The Beginning of Infinity" by David Deutsch.