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arxiv: 1910.00038 · v3 · pith:FTP76IDInew · submitted 2019-09-30 · 🪐 quant-ph · cond-mat.str-el

Quasi-exact quantum computation

classification 🪐 quant-ph cond-mat.str-el
keywords quasi-exactcomputationquantumcodecodeslogicaluniversalitygates
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We study quasi-exact quantum error correcting codes and quantum computation with them. A quasi-exact code is an approximate code such that it contains a finite number of scaling parameters, the tuning of which can flow it to corresponding exact codes, serving as its fixed points. The computation with a quasi-exact code cannot realize any logical gate to arbitrary accuracy. To overcome this, the notion of quasi-exact universality is proposed, which makes quasi-exact quantum computation a feasible model especially for executing moderate-size algorithms. We find that the incompatibility between universality and transversality of the set of logical gates does not persist in the quasi-exact scenario. A class of covariant quasi-exact codes is defined which proves to support transversal and quasi-exact universal set of logical gates for $SU(d)$. This work opens the possibility of quantum computation with quasi-exact universality, transversality, and fault tolerance.

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