Graph state

In quantum computing, a graph state is a special type of multi-qubit state that can be represented by a graph. Each qubit is represented by a vertex of the graph, and there is an edge between every interacting pair of qubits. In particular, they are a convenient way of representing certain types of entangled states.

Graph states are useful in quantum error-correcting codes, entanglement measurement and purification and for characterization of computational resources in measurement based quantum computing models.

Formal definition

Given a graph G = (V, E), with the set of vertices V and the set of edges E, the corresponding graph state is defined as

{\left|G\right\rangle }=\prod _{{(a,b)\in E}}U^{{\{a,b\}}}{\left|+\right\rangle }^{{\otimes V}}

where the operator $U^{{\{a,b\}}}$ is the controlled-Z interaction between the two vertices (qubits) a, b

U^{{\{a,b\}}}=\left[{\begin{array}{cccc}{1}&{0}&{0}&{0}\\{0}&{1}&{0}&{0}\\{0}&{0}&{1}&{0}\\{0}&{0}&{0}&{-1}\end{array}}\right]

And

{\left|+\right\rangle }={\frac {{\left|0\right\rangle }+{\left|1\right\rangle }}{{\sqrt {2}}}}

Alternative definition

An alternative and equivalent definition is the following.

Define an operator $K_{{G}}^{{(a)}}$ for each vertex a of G:

K_{{G}}^{{(a)}}=\sigma _{{x}}^{{(a)}}\prod _{{b\in N(a)}}\sigma _{{z}}^{{(b)}}

where N(a) is the neighborhood of a (that is, the set of all b such that $(a,b)\in E$ ) and $\sigma _{{x,y,z}}$ are the pauli matrices. The graph state ${\left|G\right\rangle }$ is then defined as the simultaneous eigenstate of the $N=\left|V\right|$ operators $\left\{K_{{G}}^{{(a)}}\right\}_{{a\in V}}$ with eigenvalue 1:

K_{{G}}^{{(a)}}{\left|G\right\rangle }={\left|G\right\rangle }

References

M. Hein; J. Eisert; H. J. Briegel (2004). "Multiparty entanglement in graph states". Physical Review A. 69: 062311. doi:10.1103/PhysRevA.69.062311.
S. Anders; H. J. Briegel (2006). "Fast simulation of stabilizer circuits using a graph-state representation". Physical Review A. 73: 022334. doi:10.1103/PhysRevA.73.022334.
Graph states on arxiv.org

This article is issued from Wikipedia - version of the 5/31/2016. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.

Graph state

Formal definition

Alternative definition

See also

References