In quantum information theory and operator theory, the Choi–Jamiołkowski isomorphism refers to the correspondence between quantum channels (described by completely positive maps) and quantum states (described by density matrices), this is introduced by Man-Duen Choi and Andrzej Jamiołkowski. It is also called channel-state duality by some authors in the quantum information area, but mathematically, this is a more general correspondence between positive operators and the complete positive superoperators.
To study a quantum channel
l{E}
S
S'
l{L}(l{H}S)
l{L}(l{H}S')
A
S
| ||||
| |\Phi |
in the space of
l{H}A ⊗ l{H}S
l{E}
(IA ⊗ l{E})(|\Phi+\rangle\langle\Phi+|)
l{H}A ⊗ l{H}S'
l{L}(l{H}S)
l{L}(l{H}S')
The Choi-Jamiołkowski isomorphism is a mathematical concept that connects quantum gates or operations to quantum states called Choi states. It allows us to represent a gate's properties and behavior as a Choi state.
In the generalised gate teleportation scheme, we can teleport a quantum gate from one location to another using entangled states and local operations. Here's how it works:
By combining the powers of entanglement, measurements, and local operations, the gate's effect is effectively transferred to the receiver's location.
This process enables the teleportation of gate information or the application of the gate itself, making it a fascinating method to manipulate quantum gates in a distributed manner.
Let's consider the unitary case first, where the Choi state is pure. Suppose we have two Choi states represented as
\vert\psiU\ranglei
\vert\psiV\ranglei
UV
VU
\vert\psiUV\ranglei
\vert\psiVU\ranglei
The standard approach is to use the Bell scheme, where the gate
V
\vert\psiVU\ranglei
\vert\psiUV\ranglei
UPV
To address this issue, an indirect Bell measurement is used instead of the standard Bell scheme. This measurement involves an extra qubit ancilla. The indirect Bell measurement is performed by applying a gate
UT
G(\sigma)=tr[UT\circ
| \dagger | |
| U | |
| B(\sigma |
⊗ \vert1\rangle\langle1\vert)]
| \dagger | |
| U | |
| B |
The outcome of the indirect Bell measurement corresponds to either the singlet or the triplet state. If the outcome is the singlet on sites B and C, the gate U on site C is teleported to site A, resulting in the state
\vert\psiVU\ranglei
V\dagger
\vert\psiVtU\ranglei
By applying the generalised gate teleportation scheme, the states
\vert\psiVU\ranglei
\vert\psiVtU\ranglei
VU
VtU
Although the generalised gate teleportation scheme enables the composition of Choi states and the simulation of desired gates, there is an apparent issue of transposition. However, this issue can be avoided by expressing any unitary operator as a product of two symmetric unitary operators. Therefore, for any unitary U, only two Choi program states,
\vert\psiUL\ranglei
\vert\psiUR\ranglei
In the case of channels whose Choi states are mixed states, the symmetry condition does not directly generalise as it does for unitary operators. However, a scheme based on direct-sum dilation can be employed to overcome this obstacle.
For a channel E with a set of Kraus operators
{Ki}
UKi
UKi=[[Ki,q],[1-
| \dagger | |
| K | |
| i |
Ki,-Ki]]
UKi
In this scheme, each Kraus operator is expanded to a larger unitary operator, allowing the use of symmetry-based techniques. By considering the larger unitary operators, the issue of dealing with mixed Choi states is circumvented, and the computations can proceed using unitary transformations.
The channel
E
In this scheme, the simulation of channel E involves applying the controlled-unitary gate U̘ to the input state ρ and the ancilla qubit prepared in the state |e⟩. The gate U̘ combines the Kraus operators
UKi
In comparison to the unitary case, the task here is to teleport controlled-unitary gates instead of unitary gates. This can be achieved by extending the scheme used in the unitary case. For each
UKi
Ti
Ti
UKi
UKi
UKi
ULKiURKi
ULKi
URKi
To execute the action of the channel on a state, a POVM (Positive Operator-Valued Measure) and a channel based on the state
\rho ⊕ 0
R0
K0=[p\rhot,0],K1=[p1-\rhot,0]
K2=[0,1]
E\dagger(1)
For special types of channels, the scheme can be significantly simplified. Random unitary channels, which are a broad class of channels, can be realised using the controlled-unitary scheme mentioned earlier, without the need for direct-sum dilation. Unital channels, which preserve the identity, are random unitary channels for qubits and can be easily simulated. Another type of channel is the entanglement-breaking channel, characterised by bipartite separable Choi states. These channels and program states are trivial since there is no entanglement, and they can be simulated using a measurement-preparation scheme.
Now we study the preparation of program states if they are not given for free.
A Choi state C is not easy to prepare on the first hand, namely, this may require the operation of E on the Bell state
\vert\omegai\rangle
The set of qudit channels forms a convex body. This means that a convex sum of channels still leads to a channel, and there are extreme channels that are not convex sums of others. From Choi, a channel is extreme if there exists a Kraus representation
{Ki}
{
| \dagger | |
| K | |
| i |
Kj}
d
r\leqd
It is clear to see that a gen-extreme but not extreme channel is a convex sum of extreme channels of lower ranks. It has been conjectured and numerically supported that an arbitrary channel can be written as a convex sum of at most
d
E=
| d | |
| \sum | |
| i=1 |
pi
| E | |
| gi |
d
| 4-d | |
| 2 |
To simulate the composition
QiEi
Ei
d
The Choi state
C
E
r\leqd
trAC=1,trBC=E(1)
It turns out
C=\sum{ij}\vertii\rangle\langlejj\vert ⊗ C{ij}
Cij:=E\dagger(\vertii\rangle\langlejj\vert)=\sumiCi
| \dagger | |
| U | |
| i |
UjCj
Ci\equivCii
Ui,Uj\inSU(d)
Observe that
E\dagger(\rho)=\sumij\rhoijCij=V\dagger(\rho ⊗ 1)V
V=\sumi\vertii\rangleUi\sqrt{Ci}
Here
1
V
E
V
U
U\vert0\rangle=V
E\dagger(\rho)=\langle0\vertU\dagger(\rho ⊗ 1)U\vert0\rangle
\vert0\rangle\langle0\vert
W=swap ⋅ U\dagger
Then we find
E(\rho)=trW(\rho ⊗ \vert0\rangle\langle0\vert)
W
E
Ki=\langlei\vertW\vert0\rangle
Compared with the standard (tensor-product) dilation method to simulate a general channel, which requires two qudit ancillas, the method above requires lower circuit cost since it only needs a single qudit ancilla instead of two. While the convex-sum decomposition, which is a sort of generalised eigenvalue decomposition since a gen-extreme Choi state can be mapped to a pure state, is difficult to solve for large-dimensional channels, it shall be comparable with the eigen-decomposition of the Choi state to find the set of Kraus operators. Both of the decompositions are solvable for smaller systems.
It's important to note that this discussion focuses on the primary components of the model and does not address fault tolerance, as it is beyond the scope of this model. We assume fault-tolerant qubits, gates, and measurements, which can be achieved with quantum error-correcting codes. Additionally, we highlight two intriguing issues that establish connections with standard frameworks and results.
A computation is universal if the group
SU(2n)
n
H
S
Z1/4
T
U=U\dagger
It is easy to check that the affine forms of
H
S
T
In this approach, a modification is introduced to enable the simulation of the operation
U\vertdi\rangle
U\vertdi\rangle
G
For symmetric matrices
U
\vert\psiU\ranglei
U=ULUR
\vert\psiUL\ranglei
\vert\psiUR\ranglei