par Brandeho, Mathieu 
;Roland, Jérémie
Référence 10th Conference on the Theory of Quantum Computation, Communication and Cryptography (TQC'15), Vol. 44, page (163-179)
Publication Publié, 2015
;Roland, Jérémie Référence 10th Conference on the Theory of Quantum Computation, Communication and Cryptography (TQC'15), Vol. 44, page (163-179)
Publication Publié, 2015
Publication dans des actes
| Résumé : | Quantum query complexity is known to be characterized by the so-called quantum adversary bound. While this result has been proved in the standard discrete-time model of quantum computation, it also holds for continuous-time (or Hamiltonian-based) quantum computation, due to a known equivalence between these two query complexity models. In this work, we revisit this result by providing a direct proof in the continuous-time model. One originality of our proof is that it draws new connections between the adversary bound, a modern technique of theoretical computer science, and early theorems of quantum mechanics. Indeed, the proof of the lower bound is based on Ehrenfest's theorem, while the upper bound relies on the adiabatic theorem, as it goes by constructing a universal adiabatic quantum query algorithm. Another originality is that we use for the first time in the context of quantum computation a version of the adiabatic theorem that does not require a spectral gap. |
