Cost-optimal single-qubit gate synthesis in the Clifford hierarchy

Mooney, Gary J.; Hill, Charles D.; Hollenberg, Lloyd C. L.

doi:10.22331/q-2021-02-15-396

Cited by 5 publications

(1 citation statement)

References 83 publications

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“…Each rotation R M by an angle π/2 M −1 is in the M th level of the Clifford hierarchy, and has a raw magic state cost of C(R M , η) for desired logical error rate η. In particular, the higher levels of the Clifford hierarchy consume more resources to distill [29]. Assuming controlled rotation gates cannot be directly distilled -CR z (θ) decomposes into three single rotations of θ/2, and two CNots as:…”

Section: Surface Code Implementation Cost Analysismentioning

confidence: 99%

Truncated phase-based quantum arithmetic: error propagation and resource reduction

White¹,

Hill²,

Hollenberg³

2021

Preprint

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There are two important, and potentially interconnecting, avenues to the realisation of large-scale quantum algorithms: improvement of the hardware, and reduction of resource requirements demanded by algorithm components. In focusing on the latter, one crucial subroutine to many sought-after applications is the quantum adder. A variety of different implementations exist with idiosyncratic pros and cons. One of these, the Draper quantum Fourier adder, offers the lowest qubit count of any adder, but requires a substantial number of gates as well as extremely fine rotations. In this work, we present a modification of the Draper adder which eliminates smallangle rotations to highly coarse levels, matched with some strategic corrections. This reduces hardware requirements without sacrificing the qubit saving. We show that the inherited loss of fidelity is directly given by the rate of carry and borrow bits in the computation. We derive formulae to predict this, complemented by complete gate-level matrix product state simulations of the circuit. Moreover, we analytically describe the effects of possible stochastic control error. We present an in-depth analysis of this approach in the context of Shor's algorithm, focusing on the factoring of RSA-2048. Surprisingly, we find that each of the 7 × 10 7 quantum Fourier transforms may be truncated down to π/64, with additive rotations left only slightly finer. This result is much more efficient than previously realised. We quantify savings both in terms of logical resources and raw magic states, demonstrating that phase adders can be competitive with Toffoli-based constructions.

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Section: Surface Code Implementation Cost Analysismentioning

confidence: 99%