The relationship between minimum gap and success probability in adiabatic quantum computing
Abstract
We explore the relationship between two figures of merit for an adiabatic quantum computation process: the success probability and the minimum gap between the ground and first excited states, investigating to what extent the success probability for an ensemble of problem Hamiltonians can be fitted by a function of and the computation time . We study a generic adiabatic algorithm and show that a rich structure exists in the distribution of and . In the case of two qubits, is to a good approximation a function of , of the stage in the evolution at which the minimum occurs and of . This structure persists in examples of larger systems.
Cite
@article{arxiv.1107.4034,
title = {The relationship between minimum gap and success probability in adiabatic quantum computing},
author = {M. Cullimore and M. J. Everitt and M. A. Ormerod and J. H. Samson and R. D. Wilson and A. M. Zagoskin},
journal= {arXiv preprint arXiv:1107.4034},
year = {2015}
}
Comments
13 pages, 6 figures. Substantially updated, with further discussion of the phase diagram and the relation between one- and two-qubit evolution, as well as a greatly extended list of references