Efficiency of Multi-Qubit W states in Information Processing Atul Kumar IPQI-2014 IIT Jodhpur
A pure state of two-qubits is said to be entangled if Apart from being central to the foundational aspects of quantum physics, entanglement has also been used as an efficient resource in communication protocols to perform tasks such as quantum teleportation, quantum cryptography, quantum secret sharing, quantum secure direct communication etc. quantum teleportation and entanglement swapping Our focus for this work is quantum teleportation and entanglement swapping 2 IPQI-2014
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Pictorial representation of original scheme D. Bouwmeester et al, Nature 390 (1997), animation-final2.exe 5 IPQI-2014
For multiqubit systems some of the entangled resources are Cluster states Brown States For two-qubit systems, the maximally entangled resources are Bell States; For three-qubit systems, maximally entangled GHZ States and non-maximally entangled W states 6 IPQI-2014
Teleportation of a single qubit using three-qubit W state as a resource The state to be teleported Teleportation protocol is probabilistic using standard measurements and unitary transformations Probability of teleportation depends on the unknown coefficients of state to be teleported Alternately, one can also realize teleportation with success probability of 2/3 independent of and Shi and Tomita, Phys. Lett. A 296, 161 (2002) 7 IPQI-2014
In general, quantum teleportation using partially entangled states is always probabilistic However, Agrawal and Pati proposed a new class of W type states for deterministic quantum teleportation of a single qubit P. Agrawal and A. K. Pati, Phys. Rev. A 74, (2006) Projection basis used to realize teleportation protocol for n=1 8 IPQI-2014
How is it possible? We are performing a three qubit projective measurement to achieve the task What if we perform standard two qubit and single qubit measurements? Teleportation of single qubit is still probabilistic Hence, to achieve teleportation of a single qubit using three-qubit W type of states one has to perform multiqubit measurements Distinguishing these measurements is an issue But nevertheless one can achieve perfect teleportation! 9 S. Adhikari and S. Gangopadhyay, IJTP 48, 403 (2009) IPQI-2014
In this work, we address the following questions Generalization of W type of states for perfect information transfer protocols Given a four qubit W type state shared between two users, is it possible to let these users share a two qubit entangled state using entanglement swapping? If so what is the degree of entanglement of the finally shared resource between the two users? Comparison between the three and four-qubit W states in terms of concurrence of finally shared two-qubit states 10 IPQI-2014
We generalize the three-qubit W type state for the case of four qubits And then to the case of k qubits 11 IPQI-2014
In order to teleport an unknown state Alice and Bob must share the four qubit W-like state such that Alice has qubits 1, 2 and 3 and Bob has qubit 4 Performing above four-qubit measurements on Alice’s qubits, perfect teleportation can be achieved 12 IPQI-2014
Projection basis required if the shared state is a k qubit shared entangled resource However, for practical cases we have analyzed the efficiency of W-type states for bi-partite entanglement sharing between the sender and the receiver 13 IPQI-2014
For this we use the four-qubit state as such that qubits 1, 2 and 3 are with Alice and qubit 4 is with Bob We further consider that Alice has a two-qubit entangled state The idea is to establish an entanglement between Alice’s qubit a and Bob’s qubit 4 Concurrence 14 IPQI-2014
For this Alice measures her qubits in Bell basis We consider two cases where Alice projects her qubits onto Bell states and or and After these measurements, Alice shares one of the following states with Bob or The concurrence of the shared bi-partite states between Alice and Bob can be given as or 15 IPQI-2014
For n=1, both set of measurements yield identical results For or the degree of entanglement is unity i.e. the shared state is maximally entangled! Hence, for a given value of users can in fact share maximum entanglement Above two cases are compared to ascertain the measurements to be performed for a given value of state parameter We found different ranges of the state parameter for a given n to obtain concurrence of the shared state 16 IPQI-2014
17 C alpha n=10 IPQI-2014
18 Why do we need to perform the two-qubit or single qubit measurements if Alice can share the initially entangled two qubit state with Bob? Initially entangled pair with Alice If Alice sends the qubit b to Bob through amplitude damping channel where the channel is represented by Kraus operators The shared state in this case would be Concurrence IPQI-2014
19 For a specific case of Concurrence Case I Case II Two qubit pure state Two qubit state after ADC n=1 IPQI-2014
20 n=1n=2 n=5 n=10 IPQI-2014
We have also compared the efficacy of our states with three-qubit W-type states Hence, one can share a bi-partite maximally entangled state for certain value of state parameters For certain ranges of state parameter four-qubit W-type states are more efficient resources in comparison to the three-qubit W-type states 21 IPQI-2014
22 C alpha 4 qubit state 3 qubit state 4 qubit state 3 qubit state n=10 IPQI-2014
Acknowledgement Mr. Parvinder Singh Dr. Satyabrata Adhikari IIT Jodhpur 23 IPQI-2014 Thank You