# Difference between revisions of "SymmetricExtension"

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|desc=Determines whether or not an operator has a symmetric extension | |desc=Determines whether or not an operator has a symmetric extension | ||

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|rel=[[IsPPT]]<br />[[IsSeparable]]<br />[[SymmetricInnerExtension]]<br />[[SymmetricProjection]] | |rel=[[IsPPT]]<br />[[IsSeparable]]<br />[[SymmetricInnerExtension]]<br />[[SymmetricProjection]] | ||

|cat=[[List of functions#Entanglement_and_separability|Entanglement and separability]] | |cat=[[List of functions#Entanglement_and_separability|Entanglement and separability]] |

## Latest revision as of 16:36, 13 June 2018

SymmetricExtension | |

Determines whether or not an operator has a symmetric extension | |

Other toolboxes required | CVX |
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Related functions | IsPPT IsSeparable SymmetricInnerExtension SymmetricProjection |

Function category | Entanglement and separability |

` SymmetricExtension` is a function that determines whether or not a given positive semidefinite operator has a symmetric extension. This function is extremely useful for showing that quantum states are entangled (see the Examples section). Various types of symmetric extensions (such as Bosonic and/or PPT extensions) can be looked for by specifying optional arguments in the function.

## Syntax

`EX = SymmetricExtension(X)``EX = SymmetricExtension(X,K)``EX = SymmetricExtension(X,K,DIM)``EX = SymmetricExtension(X,K,DIM,PPT)``EX = SymmetricExtension(X,K,DIM,PPT,BOS)``EX = SymmetricExtension(X,K,DIM,PPT,BOS,TOL)``[EX,WIT] = SymmetricExtension(X,K,DIM,PPT,BOS,TOL)`

## Argument descriptions

### Input arguments

`X`: A positive semidefinite operator.`K`(optional, default 2): The number of copies of the second subsystem in the desired symmetric extension.`DIM`(optional, by default has both subsystems of equal dimension): A 1-by-2 vector containing the dimensions of the two subsystems that`X`acts on.`PPT`(optional, default 0): A flag (either 1 or 0) that indicates whether or not the desired symmetric extension must have positive partial transpose.`BOS`(optional, default 0): A flag (either 1 or 0) that indicates whether or not the desired symmetric extension must be Bosonic (i.e., have its range contained within the symmetric subspace).`TOL`(optional, default`eps^(1/4)`): The numerical tolerance used throughout this script. It is recommended that this is left at the default value unless numerical problems arise and the script has difficulty determining whether or not`X`has a symmetric extension.

### Output arguments

`EX`: A flag (either 1 or 0) indicating that`X`does or does not have a symmetric extension of the desired type.`WIT`(optional): A witness that verifies that the answer provided by`EX`is correct. If`EX = 1`(i.e.,`X`has a symmetric extension) then`WIT`is such a symmetric extension. If`EX = 0`(i.e., no symmetric extension exists) then WIT is an entanglement witness with`trace(WIT*X) = -1`but`trace(WIT*Y) >= 0`for all symmetrically extendable`Y`.

## Examples

### 2-qubit symmetric extension

It is known^{[1]} that a 2-qubit state $\rho_{AB}$ has a (not necessarily PPT) symmetric extension if and only if ${\rm Tr}(\rho_B^2) \geq {\rm Tr}(\rho_{AB}^2) - 4\sqrt{\det(\rho_{AB})}$. The following code verifies that one such state does indeed have a symmetric extension.

```
>> rho = [1 0 0 -1;0 1 1/2 0;0 1/2 1 0;-1 0 0 1];
>> [trace(PartialTrace(rho)^2), trace(rho^2) - 4*sqrt(det(rho))] % if the first number is >= the second number, rho has a symmetric extension
ans =
8.0000 6.5000
>> SymmetricExtension(rho) % verify that rho has a symmetric extension
ans =
1
```

## Notes

If your goal is to detect entanglement in an operator, then it is always in your best interest to set the optional arguments `PPT` and `BOS` to be `1`. Setting `BOS = 1` increases the effectiveness of the entanglement test without any computational overhead at all. Setting `PPT = 1` slows down the computation quite a bit, but increases the effectiveness as an entanglement test *considerably*.

## Source code

Click on "expand" to the right to view the MATLAB source code for this function.

## References

- ↑ J. Chen, Z. Ji, D. Kribs, N. Lütkenhaus, and B. Zeng.
*Symmetric extension of two-qubit states*. E-print: arXiv:1310.3530 [quant-ph]