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Paper 1

Higher-dimensional quantum hypergraph-product codes

Weilei Zeng, Leonid P. Pryadko

Year: 2018
Journal: arXiv preprint
DOI: arXiv:1810.01519
arXiv: 1810.01519

We describe a family of quantum error-correcting codes which generalize both the quantum hypergraph-product (QHP) codes by Tillich and Zémor, and all families of toric codes on $m$-dimensional hypercubic lattices. Similar to the latter, our codes form $m$-complexes ${\cal K}_m$, with $m\ge2$. These are defined recursively, with ${\cal K}_m$ obtained as a tensor product of a complex ${\cal K}_{m-1}$ with a $1$-complex parameterized by a binary matrix. Parameters of the constructed codes are given explicitly in terms of those of binary codes associated with the matrices used in the construction.

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Paper 2

Fault tolerance with noisy and slow measurements and preparation.

Paz-Silva GA, Brennen GK, Twamley J.

Year: 2010
Journal: Phys Rev Lett
DOI: 10.1103/physrevlett.105.100501
arXiv: -

No abstract.

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