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Exponential Quantum Speed-ups are Generic

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arxiv 1010.3654 v2 pith:5IANDOZZ submitted 2010-10-18 quant-ph

Exponential Quantum Speed-ups are Generic

classification quant-ph
keywords quantumclassicalproblemexponentialalmostapproximateblack-boxcircuit
verification ladder T0 review T1 audit T2 compute T3 formal T4 reserved
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A central problem in quantum computation is to understand which quantum circuits are useful for exponential speed-ups over classical computation. We address this question in the setting of query complexity and show that for almost any sufficiently long quantum circuit one can construct a black-box problem which is solved by the circuit with a constant number of quantum queries, but which requires exponentially many classical queries, even if the classical machine has the ability to postselect. We prove the result in two steps. In the first, we show that almost any element of an approximate unitary 3-design is useful to solve a certain black-box problem efficiently. The problem is based on a recent oracle construction of Aaronson and gives an exponential separation between quantum and classical bounded-error with postselection query complexities. In the second step, which may be of independent interest, we prove that linear-sized random quantum circuits give an approximate unitary 3-design. The key ingredient in the proof is a technique from quantum many-body theory to lower bound the spectral gap of local quantum Hamiltonians.

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