teleporting an unknown quantum state via dual classical ... · teleporting an unknown quantum state...

Teleporting an Unknown Quantum State Via Dual Classical and

Einstein‐Podolsky‐Rosen ChannelsCharles H. Bennet, Gilles Brassard, Claude Crépeau,Richard Jozsa, Asher Peres, and William K. Wootters

Teleporting an Unknown Quantum State Via Dual Classical and Einstein‐Podolsky‐Rosen Channels 1

Team 10

Sheikh, MohammedSteiner, CharlesTsang, Chi Hang BoyceTiwari, Apoorv

*C. H. Bennett, G. Brassard, C. Crépeau, R. Jozsa, A. Peres, and W. K. Wootters, Phys. Rev. Lett. 70, 1895 (1993).

Outline

• The problem and required background• Teleportation procedure• Critical review• Experimental realization and summary


A modern problem in gift‐giving• We have two people, Alice and Bob.

• Alice wants to send Bob a particle as a gift. The problem is she doesn’t know what the state of the particle is. And unfortunately she can’t give it to Bob directly.

• We’ll call the state of the particle |

• How does she get the particle | to Bob?

The problem and required background

Quantum Entanglement• Entangled states are states such that measurement of one particle’s state

also collapses the other particle’s state.

• Measuring |0 A for particle A will collapse particle B’s state to |1 B.

The problem and required background 4

Can particle A’s state be measured in an arbitrary basis?

• Apply a unitary transformation to the (|0 A, |1 A) basis.

• For example:

(|0 A, |1 A) ( |0 A + |1 A, |0 A ‐ |1 A) = (|ψ +, |ψ −)

Then my entangled state will be:

|0 B + |1 B) |ψ + + |0 B ‐ |1 B) |ψ −


The Bell basis is the basis of a two‐particle entangled state

• The Bell basis has a total of four possible basis vectors.

• In quantum teleportation, three states are needed, two of which are entangled. The Bell basis serves are the measurement basis for Alice.


Outline



Quantum teleportation from Alice to Bob

Measures her qubits in the Bell Basis

Classical signal of result

Quantum operation on

qubit 3Teleportation Procedure

Putting the problem in the Bell basis

If Alice measures

Bob’s qubit

becomes3‐particle state becomes

Teleportation Procedure 9

Alice and Bob again

MeasureΨ+

Ψ-

Φ+

Φ-

Qubitbecomesα|0>+β|1>α|0>‐β|1>α|1>+β|0>α|1>‐β|0>

Result

Recovery operation

Teleportation Procedure 10

Outline



What is expected from this paper?• Reminded that the following

were impossible at the beginning

• Superluminal information transfer• Quantum state cloning• Broadcast of quantum state

• Showed interesting point of the procedure– Teleportation is still possible

without knowing• State being teleported• Location of receiver (almostbroadcasting!)

“It is known that instantaneous information transfer is impossible.”

Critical Review 12

Why is this procedure important?

• Paper mentioned relevance to quantum cryptography, quantum parallel computation…

• Quantum Key Distribution– Shared Private Key is crucial to cryptography– Use quantum teleportation to generate shared keys– Eavesdropper will destroy entanglement and hence be detected

Critical Review 13

100110011101…

Outline



Experimental Quantum Teleportation

• First experiments with photons:– D. Bouwmeester, J.‐W. Pan, K. Mattle, M. Eibl, H. Weinfurter, A. Zeilinger,

Experimental Quantum Teleportation, Nature 390, 6660, 575‐579 (1997).

– D. Boschi, S. Branca, F. De Martini, L. Hardy, & S. Popescu, Experimental

Realization of Teleporting an Unknown Pure Quantum State via Dual

classical and Einstein‐Podolsky‐Rosen channels, Phys. Rev Lett. 80, 6, 1121‐

1125 (1998)

– I. Marcikic, H. de Riedmatten, W. Tittel, H. Zbinden, N. Gisin, Long‐Distance

Teleportation of Qubits at Telecommunication Wavelengths, Nature, 421,

509 (2003)

Experimental Realization and Summary 15

Photon Entanglement

• Parametric Down Conversion– Inside a nonlinear crystal, an incoming pump photon can decay

spontaneously into two photons.


Experimental Quantum Teleportation

• Experiments with Atoms:– M. Riebe, H. Häffner, C. F. Roos, W. Hänsel, M. Ruth, J. Benhelm,

G. P. T. Lancaster, T. W. Körber, C. Becher, F. Schmidt‐Kaler, D. F. V. James, R. Blatt, Deterministic Quantum Teleportation with Atoms, Nature 429, 734‐737 (2004)

– M. D. Barrett, J. Chiaverini, T. Schaetz, J. Britton, W. M. Itano, J. D. Jost, E. Knill, C. Langer, D. Leibfried, R. Ozeri, D. J. Wineland, Deterministic Quantum Teleportation of Atomic Qubits, Nature 429, 737 (2004).

– S. Olmschenk, D. N. Matsukevich, P. Maunz, D. Hayes, L.‐M. Duan, and C. Monroe, Quantum Teleportation between Distant Matter Qubits, Science 323, 486 (2009).


Citation Report• Total Citations : 4977

• Top Cited articles:• Quantum Cryptography

Author(s): Gisin N; Ribordy GG; Tittel W; et al. Quantum Cryptography ,REVIEWS OF MODERN PHYSICS 74 ,145‐195 (JAN 2002)

• Bouwmeester D; Pan JW; Mattle K; et al., Experimental quantum teleportation NATURE 390 ,6660 ,575‐579 ,1997 Times Cited: 2,074

• Bennett CH; DiVincenzo DP; Smolin JA; et al. Mixed‐state entanglement and quantum error correction PHYSICAL REVIEW A , 54 , 5 . 3824‐3851 .1996 Times Cited: 2,043

• Knill E; Laflamme R; Milburn GJ A scheme for efficient quantum computation with linear optics NATURE 409 ,6816 , 46‐52 , 2001 Times Cited: 1,668


Thank you for your attention!


BB84 Protocol• Quantum Key Distribution (BB84)*

– Shared Private Key is crucial to cryptography1. Alice prepare two particles with some basis ( or )2. Alice measure the state of particle with same basis3. Bob measure the particle with random basis4. Choices of axes are then made public5. Measurement in same axis: Results become shared key6. Compare subset of string to detect eavesdropper


*Table extracted on 10/12/2011, from Wikipedia, “Quantum key distribution”

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