General error estimate for adiabatic quantum computing
Abstract
Most investigations devoted to the conditions for adiabatic quantum computing are based on the first-order correction ground(t) H(t) excited(t) / E2(t)1. However, it is demonstrated that this first-order correction does not yield a good estimate for the computational error. Therefore, a more general criterion is proposed, which includes higher-order corrections as well and shows that the computational error can be made exponentially small -- which facilitates significantly shorter evolution times than the above first-order estimate in certain situations. Based on this criterion and rather general arguments and assumptions, it can be demonstrated that a run-time T of order of the inverse minimum energy gap E min is sufficient and necessary, i.e., T=( E min-1). For some examples, these analytical investigations are confirmed by numerical simulations. PACS: 03.67.Lx, 03.67.-a.
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