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Accelerated Variational Quantum Eigensolver

Quantum Physics 2019-04-16 v3
Authors: Daochen Wang , Oscar Higgott , Stephen Brierley
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Abstract

The problem of finding the ground state energy of a Hamiltonian using a quantum computer is currently solved using either the quantum phase estimation (QPE) or variational quantum eigensolver (VQE) algorithms. For precision ϵ\epsilon, QPE requires O(1)O(1) repetitions of circuits with depth O(1/ϵ)O(1/\epsilon), whereas each expectation estimation subroutine within VQE requires O(1/ϵ2)O(1/\epsilon^{2}) samples from circuits with depth O(1)O(1). We propose a generalised VQE algorithm that interpolates between these two regimes via a free parameter α[0,1]\alpha\in[0,1] which can exploit quantum coherence over a circuit depth of O(1/ϵα)O(1/\epsilon^{\alpha}) to reduce the number of samples to O(1/ϵ2(1α))O(1/\epsilon^{2(1-\alpha)}). Along the way, we give a new routine for expectation estimation under limited quantum resources that is of independent interest.

Keywords

variational quantum eigensolver quantum algorithms quantum search algorithms

Cite

@article{arxiv.1802.00171,
  title  = {Accelerated Variational Quantum Eigensolver},
  author = {Daochen Wang and Oscar Higgott and Stephen Brierley},
  journal= {arXiv preprint arXiv:1802.00171},
  year   = {2019}
}

Comments

11 pages

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