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Probabilistically perfect quantum cloning and unambiguous state discrimination
We consider the N → M probabilistically perfect quantum cloning machine that perfectly produces M faithful copies from N identical input states, where the input states are selected, with prior probabilities η 1and η 2 = 1 − η 1, from a given set of the two linearly independent states | ψ 1〉 ⊗ N = (c...
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| Published in: | Optics communications 2010-10, Vol.283 (19), p.3818-3824 |
|---|---|
| Main Authors: | , , , |
| Format: | Article |
| Language: | English |
| Subjects: | |
| Citations: | Items that this one cites Items that cite this one |
| Online Access: | Get full text |
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| Summary: | We consider the
N
→
M probabilistically perfect quantum cloning machine that perfectly produces
M faithful copies from
N identical input states, where the input states are selected, with prior probabilities
η
1and
η
2
=
1
−
η
1, from a given set of the two linearly independent states |
ψ
1〉
⊗
N
=
(cos
θ|0〉
+
sin
θ|1〉)
⊗
N
and |
ψ
2〉
⊗
N
=
(sin
θ|0〉
+
cos
θ|1〉)
⊗
N
(
θ
∈
0
,
π
/
2
). We derive the optimal distribution of the success probabilities. When
M approaches infinite, the probabilistically perfect quantum cloning can be regarded as a kind of the unambiguous state discrimination, and theoretically provides the upper bound of the unambiguous state discrimination. By using the optimal distribution of the success probabilities of the optimal asymmetric 1
→
M probabilistically perfect quantum cloning, we can derive the maximum average success probability of the unambiguous discrimination of two nonorthogonal quantum states |
ψ
1〉and|
ψ
2〉. As an example, we give the explicit transformation of the optimal symmetric 1
→
M probabilistically perfect quantum cloning to copy the two input states |
ψ
1〉 and |
ψ
2〉. |
|---|---|
| ISSN: | 0030-4018 1873-0310 |
| DOI: | 10.1016/j.optcom.2010.05.046 |