Related papers: Optimizing nonadiabatic geometric quantum gates against off-resonance error by dynamical correction in a silicon-based spin qubit

Optimizing nonadiabatic geometric quantum gates against off-resonance error by dynamical correction in a silicon-based spin qubit

URL: http://arxiv.org/abs/2207.04597v2
Date: Mon, 9 Jan 2023 03:19:21 GMT
Title: Optimizing nonadiabatic geometric quantum gates against off-resonance error by dynamical correction in a silicon-based spin qubit
Authors: Liu-Jun Guo, Hai Xu, Zi-Yu Fang, Tao Chen, Kejin Wei, Chengxian Zhang
Abstract summary: In silicon-based spin qubits, the off-resonance error is the dominant noise, which can cause dephasing. We find that by picking up a specific evolution path inserted by only a $pi$-pulse dynamically corrected sequence, the optimized geometric gate is robust to the off-resonance error.
Score: 4.107057180879791
License: http://arxiv.org/licenses/nonexclusive-distrib/1.0/
Abstract: Geometric quantum gates are performed by using the geometric phase, making them particularly robust to the pulse amplitude error due to the intrinsic global property. However, in many systems, such as the silicon-based spin qubits, the off-resonance error is the dominant noise, which can cause dephasing and is always difficult to deal with for a geometric gate. Thus how to deal with the off-resonance error is very significant for the application of the geometric gates. A recent work in \emph{Phy. Rev. Appl. 16, 044005 (2021)} reveals that by inserting two $\pi$-pulse dynamically corrected sequences into the evolution paths, the holonomic quantum gate is effective to suppress the pulse amplitude error, however it is still useless for combating the off-resonance error. Inspired by this work, we combine using the techniques of dynamical correction and path design. Surprisingly, we find that by picking up a specific evolution path inserted by only a $\pi$-pulse dynamically corrected sequence, the obtained optimized geometric gate is robust to the off-resonance error, assuming the noise is static. Further, by calculating the filter function considering the realistic $1/f$-type noise in silicon, the related results show that the performance of the optimized geometric gate can also surpass both the conventional geometric gate and the naive dynamical gate constructed without using the geometric phase. Our results indicate dynamical correction is an powerful tool to improve the geometric gate.

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