Quantum entanglement

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Quantum mechanics

$\Delta x \, \Delta p \ge \frac{\hbar}{2}$

Background
Classical mechanics Old quantum theory Interference · Bra-ket notation Hamiltonian

Fundamental concepts
Quantum state · Wave function Superposition · Entanglement Measurement · Uncertainty Exclusion · Duality Decoherence · Ehrenfest theorem · Tunneling

Experiments
Double-slit experiment Davisson–Germer experiment Stern–Gerlach experiment Bell's inequality experiment Popper's experiment Schrödinger's cat Elitzur-Vaidman bomb-tester

Formulations
Schrödinger picture Heisenberg picture Interaction picture Matrix mechanics Sum over histories

Equations
Schrödinger equation Pauli equation Klein–Gordon equation Dirac equation

Interpretations
Copenhagen · Ensemble Hidden variable theory · Transactional Many-worlds · Consistent histories Quantum logic

Advanced topics
Quantum field theory Quantum gravity Theory of everything

Scientists
Planck · Einstein · Bohr · Sommerfeld · Kramers · Heisenberg· Born · Jordan · Pauli · Dirac · de Broglie ·Schrödinger · von Neumann · Wigner · Feynman · Bohm · Everett · Bell

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Quantum entanglement is a quantum mechanical phenomenon in which the quantum states of two or more objects are linked together so that one object can no longer be adequately described without full mention of its counterpart — even though the individual objects may be spatially separated. This interconnection leads to correlations between observable physical properties of remote systems. For example, quantum mechanics holds that states such as spin are indeterminate until such time as some physical intervention is made to measure the spin of the object in question. It is equally as likely that any given particle will be observed to be spin-up as that it will be spin-down. Measuring any number of particles will result in an unpredictable series of measures that will tend more and more closely to half up and half down. However, if this experiment is done with entangled particles the results are quite different. When two members of an entangled pair are measured, one will always be spin-up and the other will be spin-down. The distance between the two particles is irrelevant. In order to explain this result, some have theorized that there are hidden variables that account for the spin of each particle, and that these hidden variables are determined when the entangled pair is created. But, if this is so, then the hidden variables must be in communication no matter how far apart the particles are, the hidden variable describing one particle must be able to change instantly when the other is measured. If the hidden variables stop interacting when they are far apart, the statistics of the measurements obey an inequality, which is violated both in quantum mechanics and in experiments.

The phenomenon of wavefunction collapse leads to the impression that measurements performed on one system instantaneously influence the other systems entangled with the measured system, even when far apart. But quantum entanglement does not enable the transmission of classical information faster than the speed of light in quantum mechanics.

Quantum entanglement has applications in the emerging technologies of quantum computing and quantum cryptography, and has been used to realize quantum teleportation experimentally. At the same time, it prompts some of the more philosophically oriented discussions concerning quantum theory. The correlations predicted by quantum mechanics, and observed in experiment, reject the principle of local realism, which is that information about the state of a system can only be mediated by interactions in its immediate surroundings and that the state of a system exists and is well-defined before any measurement. Different views of what is actually occurring in the process of quantum entanglement can be related to different interpretations of quantum mechanics. In the standard one, the Copenhagen interpretation, quantum mechanics is neither "real" (since measurements do not state, but instead prepare properties of the system) nor "local" (since the state vector $|\psi\rangle$ comprises the simultaneous probability amplitudes for all positions, e.g. $|\psi\rangle \to \psi(x,y,z)$ ).

1 Background
2 Pure States
3 Ensembles
4 Reduced Density Matrices
5 Entropy
- 5.1 Definition
- 5.2 As a measure of entanglement
6 Applications of entanglement
7 See also
8 References
9 External links

[edit] Background

Entanglement is one of the properties of quantum mechanics that caused Einstein and others to dislike the theory. In 1935, Einstein, Podolsky, and Rosen formulated the EPR paradox, a quantum-mechanical thought experiment with a highly counterintuitive and apparently nonlocal outcome, in response to Niels Bohr's advocacy of the belief that quantum mechanics as a theory was complete. Einstein famously derided entanglement as "spukhafte Fernwirkung" or "spooky action at a distance." In fact, it was his belief that future mathematicians would, in fact, discover that quantum entanglement actually entailed nothing more or less than an error in their calculations. As he once wrote: "I find the idea quite intolerable that an electron exposed to radiation should choose of its own free will, not only its moment to jump off, but also its direction. In that case, I would rather be a cobbler, or even an employee in a gaming house, than a physicist.”

On the other hand, quantum mechanics has been highly successful in producing correct experimental predictions, and the strong correlations predicted by the theory of quantum entanglement have now in fact been observed. One apparent way to explain found correlations in line with the predictions of quantum entanglement is an approach known as "local hidden variable theory", in which unknown, shared, local parameters would cause the correlations. However, in 1964 John Stewart Bell derived an upper limit, known as Bell's inequality, on the strength of correlations for any theory obeying "local realism." Quantum entanglement can lead to stronger correlations that violate this limit, so that quantum entanglement is experimentally distinguishable from a broad class of local hidden-variable theories. Results of subsequent experiments have overwhelmingly supported quantum mechanics. Although there may be experimental problems, known as "loopholes," that affect the validity of these experimental findings. High-efficiency and high-visibility experiments are now in progress that should confirm or invalidate the existence of those loopholes. For more information, see the article on experimental tests of Bell's inequality.

Observations pertaining to entangled states appear to conflict with the property of relativity that information cannot be transferred faster than the speed of light. Although two entangled systems appear to interact across large spatial separations, the current state of belief is that no useful information can be transmitted in this way, meaning that causality cannot be violated through entanglement. This is the statement of the no communication theorem.

Even if information can not be transmitted through entanglement alone, it is believed that it is possible to transmit information using a set of entangled states used in conjunction with a classical information channel. This process is known as quantum teleportation. Despite its name, quantum teleportation may still not permit information to be transmitted faster than light, because a classical information channel is required to complete the process.

In addition experiments are underway to see if entanglement is the result of retrocausality. ^[1]^[2]

[edit] Pure States

The following discussion builds on the theoretical framework developed in the articles bra-ket notation and mathematical formulation of quantum mechanics.

Consider two noninteracting systems $A$ and $B$ , with respective Hilbert spaces $H A$ and $H B$ . The Hilbert space of the composite system is the tensor product

$H_A \otimes H_B .$

If the first system is in state $| \psi \rangle_A$ and the second in state $| \phi \rangle_B$ , the state of the composite system is

$|\psi\rangle_A \otimes |\phi\rangle_B,$

which is often also written as

$|\psi\rangle_A \; |\phi\rangle_B.$

States of the composite system which can be represented in this form are called separable states, or product states.

Not all states are product states. Fix a basis $\{|i \rangle_A\}$ for $H A$ and a basis $\{|j \rangle_B\}$ for $H B$ . The most general state in $H_A \otimes H_B$ is of the form

$\sum_{i,j} c_{ij} |i\rangle_A \otimes |j\rangle_B$ .

If a state is inseparable, it is called an entangled state.

For example, given two basis vectors $\{|0\rangle_A, |1\rangle_A\}$ of $H A$ and two basis vectors $\{|0\rangle_B, |1\rangle_B\}$ of $H B$ , the following is an entangled state:

${1 \over \sqrt{2}} \bigg( |0\rangle_A \otimes |1\rangle_B - |1\rangle_A \otimes |0\rangle_B \bigg)$ .

If the composite system is in this state, it is impossible to attribute to either system $A$ or system $B$ a definite pure state. Instead, their states are superposed with one another. In this sense, the systems are "entangled".

Now suppose Alice is an observer for system $A$ , and Bob is an observer for system $B$ . If Alice makes a measurement in the $\{|0\rangle, |1\rangle\}$ eigenbasis of A, there are two possible outcomes, occurring with equal probability:

Alice measures 0, and the state of the system collapses to $|0\rangle_A |1\rangle_B$
Alice measures 1, and the state of the system collapses to $|1\rangle_A |0\rangle_B$ .

If the former occurs, then any subsequent measurement performed by Bob, in the same basis, will always return 1. If the latter occurs, (Alice measures 0) then Bob's measurement will also return 0 with certainty. Thus, system B has been altered by Alice performing a local measurement on system A. This remains true even if the systems A and B are spatially separated. This is the foundation of the EPR paradox.

The outcome of Alice's measurement is random. Alice cannot decide which state to collapse the composite system into, and therefore cannot transmit information to Bob by acting on her system. Causality is thus preserved, in this particular scheme. For the general argument, see no communication theorem.

In some formal mathematical settings, it is noted that the correct setting for pure states in quantum mechanics is projective Hilbert space endowed with the Fubini-Study metric. The product of two pure states is then given by the Segre embedding.

[edit] Ensembles

As mentioned above, a state of a quantum system is given by a unit vector in a Hilbert space. More generally, if one has a large number of copies of the same system, then the state of this ensemble is described by a density matrix, which is a positive matrix, or a trace class when the state space is infinite dimensional, and has trace 1. Again, by the spectral theorem, such a matrix takes the general form:

$\rho = \sum_i w_i |\alpha_i\rangle \langle\alpha_i|$ ,

where the $w i$ 's sum up to 1, and in the infinite dimensional case, we would take the closure of such states in the trace norm. We can interpret $ρ$ as representing an ensemble where $w i$ is the proportion of the ensemble whose states are $|\alpha_i\rangle$ . When a mixed state has rank 1, it therefore describes a pure ensemble. When there is less than total information about the state of a quantum system we need density matrices to represent the state.

Following the definition in previous section, for a bipartite composite system, mixed states are just density matrices on $H_A \otimes H_B$ . Extending the definition of separability from the pure case, we say that a mixed state is separable if it can be written as

$\rho = \sum_i p_i \rho_i^A \otimes \rho_i^B$ ,

where $\rho_i^A$ 's and $\rho_i^B$ 's are they themselves states on the subsystems A and B respectively. In other words, a state is separable if it is probability distribution over uncorrelated states, or product states. We can assume without loss of generality that $\rho_i^A$ and $\rho_i^B$ are pure ensembles. A state is then said to be entangled if it is not separable. In general, finding out whether or not a mixed state is entangled is considered difficult. Formally, it has been shown to be NP-hard. For the $2 \times 2$ and $2 \times 3$ cases, a necessary and sufficient criterion for separability is given by the famous Positive Partial Transpose (PPT) condition.

Experimentally, a mixed ensemble might be realized as follows. Consider a "black-box" apparatus that spits electrons towards an observer. The electrons' Hilbert spaces are identical. The apparatus might produce electrons that are all in the same state; in this case, the electrons received by the observer are then a pure ensemble. However, the apparatus could produce electrons in different states. For example, it could produce two populations of electrons: one with state $|\mathbf{z}+\rangle$ with spins aligned in the positive $\mathbf{z}$ direction, and the other with state $|\mathbf{y}-\rangle$ with spins aligned in the negative $\mathbf{y}$ direction. Generally, this is a mixed ensemble, as there can be any number of populations, each corresponding to a different state.

[edit] Reduced Density Matrices

Consider as above systems $A$ and $B$ each with a Hilbert space $H A$ , $H B$ . Let the state of the composite system be

$|\Psi \rangle \in H_A \otimes H_B.$

As indicated above, in general there is no way to associate a pure state to the component system $A$ . However, it still is possible to associate a density matrix. Let

$\rho_T = |\Psi\rangle \; \langle\Psi|$ .

which is the projection operator onto this state. The state of $A$ is the partial trace of $ρ T$ over the basis of system $B$ :

$\rho_A \ \stackrel{\mathrm{def}}{=}\ \sum_j \langle j|_B \left( |\Psi\rangle \langle\Psi| \right) |j\rangle_B = \hbox{Tr}_B \; \rho_T$ .

$ρ A$ is sometimes called the reduced density matrix of $ρ$ on subsystem A. Colloquially, we "trace out" system B to obtain the reduced density matrix on A.

For example, the density matrix of $A$ for the entangled state discussed above is

$\rho_A = (1/2) \bigg( |0\rangle_A \langle 0|_A + |1\rangle_A \langle 1|_A \bigg)$

This demonstrates that, as expected, the reduced density matrix for an entangled pure ensemble is a mixed ensemble. Also not surprisingly, the density matrix of $A$ for the pure product state $|\psi\rangle_A \otimes |\phi\rangle_B$ discussed above is

$\rho_A = |\psi\rangle_A \langle\psi|_A .$

In general, a bipartite pure state ρ is entangled if and only if one, meaning both, of its reduced states are mixed states.

[edit] Entropy

In this section we briefly discuss entropy of a mixed state and how it can be viewed as a measure of entanglement.

[edit] Definition

In classical information theory, to a probability distribution $p_1, \cdots, p_n$ , one can associate the Shannon entropy:

$H(p_1, \cdots, p_n ) = - \sum_i p_i \log_2 p_i,$

Since a mixed state ρ is a probability distribution over an ensemble, this leads naturally to the definition of the von Neumann entropy:

$S(\rho) = - \hbox{Tr} \left( \rho \log {\rho} \right),$

where the logarithm is again taken in base 2. In general, to calculate $\; \log \rho$ , one would use the Borel functional calculus. If ρ acts on a finite dimensional Hilbert space and has eigenvalues $\lambda_1, \cdots, \lambda_n$ , then we recover the Shannon entropy:

$S(\rho) = - \hbox{Tr} \left( \rho \log {\rho} \right) = - \sum_i \lambda_i \log \lambda_i$ .

Since an event of probability 0 should not contribute to the entropy, we adopt the convention that $0 \log 0 \; = 0$ . This extends to the infinite dimensional case as well: if ρ has spectral resolution $\rho = \int \lambda d P_{\lambda}$ , then we assume the same convention when calculating

$\rho \log \rho = \int \lambda \log \lambda d P_{\lambda} .$

As in statistical mechanics, one can say that the more uncertainty (number of microstates) the system should possess, the larger the entropy. For example, the entropy of any pure state is zero, which is unsurprising since there is no uncertainty about a system in a pure state. The entropy of any of the two subsystems of the entangled state discussed above is $log2$ (which can be shown to be the maximum entropy for $2 \times 2$ mixed states).

[edit] As a measure of entanglement

Entropy provides one tool which can be used to quantify entanglement (although other entanglement measures exist). If the overall system is pure, the entropy of one subsystem can be used to measure its degree of entanglement with the other subsystems.

For bipartite pure states, the von Neumann entropy of reduced states is the unique measure of entanglement in the sense that it is the only function on the family of states that satisfies certain axioms required of an entanglement measure.

It is a classical result that the Shannon entropy achieves its maximum at, and only at, the uniform probability distribution {1/n,...,1/n}. Therefore, a bipartite pure state

$\rho \in H \otimes H$

is said to be a maximally entangled state if there exists some local bases on H such that the reduced state of ρ is the diagonal matrix

$\begin{bmatrix} \frac{1}{n}& \; & \; \\ \; & \ddots & \; \\ \; & \; & \frac{1}{n}\end{bmatrix}.$

For mixed states, the reduced von Neumann entropy is not the unique entanglement measure.

As an aside, the information-theoretic definition is closely related to entropy in the sense of statistical mechanics (comparing the two definitions, we note that, in the present context, it is customary to set the Boltzmann constant $k = 1$ ). For example, by properties of the Borel functional calculus, we see that for any unitary operator U,

$S(\rho) \; = S(U \rho U^*)$ .

Indeed, without the above property, the von Neumann entropy would not be well-defined. In particular, U could be the time evolution operator of the system, i.e.

$U(t) \; = \exp \left(\frac{-i H t }{\hbar}\right)$

where H is the Hamiltonian of the system. This associates the reversibility of a process with its resulting entropy change, i.e. a process is reversible if, and only if, it leaves the entropy of the system invariant. This provides a connection between quantum information theory and thermodynamics.

[edit] Applications of entanglement

Entanglement has many applications in quantum information theory. Mixed state entanglement can be viewed as a resource for quantum communication. With the aid of entanglement, otherwise impossible tasks may be achieved. Among the best known applications of entanglement are superdense coding and quantum state teleportation. Efforts to quantify this resource are often termed entanglement theory. See for example Entanglement Theory Tutorials.

Other uses:

Quantum computers use entanglement and superposition.

The Reeh-Schlieder theorem of quantum field theory is sometimes seen as the QFT analogue of quantum entanglement.

[edit] See also

[edit] References

^ Paulson, Tom (2006-11-15). "Going for a blast in the real past". Seattle Post-Intelligencer.
^ Boyle, Alan (2006-11-21). Time-travel physics seems stranger than fiction. MSNBC. Retrieved on 2006-12-19.

M. Horodecki, P. Horodecki, R. Horodecki, "Separability of Mixed States: Necessary and Sufficient Conditions", Physics Letters A 210, 1996.

L. Gurvits, "Classical deterministic complexity of Edmonds' Problem and quantum entanglement", Proceedings of the thirty-fifth annual ACM symposium on Theory of computing, 2003.

I. Bengtsson and K. Zyczkowski, "Geometry of Quantum States. An Introduction to Quantum Entanglement", Cambridge University Press, Cambridge, 2006.

E. G. Steward, "Quantum Mechanics: Its Early Development and the Road to Entanglement", World Scientific Publishing, 2008.

[edit] External links

Categories: Quantum information science | Quantum mechanics

Quantum entanglement

From Wikipedia, the free encyclopedia

Contents

[edit] Background

[edit] Pure States

[edit] Ensembles

[edit] Reduced Density Matrices

[edit] Entropy

[edit] Definition

[edit] As a measure of entanglement

[edit] Applications of entanglement

[edit] See also

[edit] References

[edit] External links

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