Primitive Quantum Gates for an SU(2) Discrete Subgroup: Binary Octahedral

Abstract

We construct a primitive gate set for the digital quantum simulation of the 48-element binary octahedral (BO) group. This nonabelian discrete group better approximates SU(2) lattice gauge theory than previous work on the binary tetrahedral group at the cost of one additional qubit -- for a total of six -- per gauge link. The necessary primitives are the inversion gate, the group multiplication gate, the trace gate, and the BO Fourier transform.

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