777 research outputs found
Generalized Quantum Arthur-Merlin Games
This paper investigates the role of interaction and coins in public-coin
quantum interactive proof systems (also called quantum Arthur-Merlin games).
While prior works focused on classical public coins even in the quantum
setting, the present work introduces a generalized version of quantum
Arthur-Merlin games where the public coins can be quantum as well: the verifier
can send not only random bits, but also halves of EPR pairs. First, it is
proved that the class of two-turn quantum Arthur-Merlin games with quantum
public coins, denoted qq-QAM in this paper, does not change by adding a
constant number of turns of classical interactions prior to the communications
of the qq-QAM proof systems. This can be viewed as a quantum analogue of the
celebrated collapse theorem for AM due to Babai. To prove this collapse
theorem, this paper provides a natural complete problem for qq-QAM: deciding
whether the output of a given quantum circuit is close to a totally mixed
state. This complete problem is on the very line of the previous studies
investigating the hardness of checking the properties related to quantum
circuits, and is of independent interest. It is further proved that the class
qq-QAM_1 of two-turn quantum-public-coin quantum Arthur-Merlin proof systems
with perfect completeness gives new bounds for standard well-studied classes of
two-turn interactive proof systems. Finally, the collapse theorem above is
extended to comprehensively classify the role of interaction and public coins
in quantum Arthur-Merlin games: it is proved that, for any constant m>1, the
class of problems having an m-turn quantum Arthur-Merlin proof system is either
equal to PSPACE or equal to the class of problems having a two-turn quantum
Arthur-Merlin game of a specific type, which provides a complete set of quantum
analogues of Babai's collapse theorem.Comment: 31 pages + cover page, the proof of Lemma 27 (Lemma 24 in v1) is
corrected, and a new completeness result is adde
Quantum proofs can be verified using only single qubit measurements
QMA (Quantum Merlin Arthur) is the class of problems which, though
potentially hard to solve, have a quantum solution which can be verified
efficiently using a quantum computer. It thus forms a natural quantum version
of the classical complexity class NP (and its probabilistic variant MA,
Merlin-Arthur games), where the verifier has only classical computational
resources. In this paper, we study what happens when we restrict the quantum
resources of the verifier to the bare minimum: individual measurements on
single qubits received as they come, one-by-one. We find that despite this
grave restriction, it is still possible to soundly verify any problem in QMA
for the verifier with the minimum quantum resources possible, without using any
quantum memory or multiqubit operations. We provide two independent proofs of
this fact, based on measurement based quantum computation and the local
Hamiltonian problem, respectively. The former construction also applies to
QMA, i.e., QMA with one-sided error.Comment: 7 pages, 1 figur
Merlin-Arthur with efficient quantum Merlin and quantum supremacy for the second level of the Fourier hierarchy
We introduce a simple sub-universal quantum computing model, which we call
the Hadamard-classical circuit with one-qubit (HC1Q) model. It consists of a
classical reversible circuit sandwiched by two layers of Hadamard gates, and
therefore it is in the second level of the Fourier hierarchy. We show that
output probability distributions of the HC1Q model cannot be classically
efficiently sampled within a multiplicative error unless the polynomial-time
hierarchy collapses to the second level. The proof technique is different from
those used for previous sub-universal models, such as IQP, Boson Sampling, and
DQC1, and therefore the technique itself might be useful for finding other
sub-universal models that are hard to classically simulate. We also study the
classical verification of quantum computing in the second level of the Fourier
hierarchy. To this end, we define a promise problem, which we call the
probability distribution distinguishability with maximum norm (PDD-Max). It is
a promise problem to decide whether output probability distributions of two
quantum circuits are far apart or close. We show that PDD-Max is BQP-complete,
but if the two circuits are restricted to some types in the second level of the
Fourier hierarchy, such as the HC1Q model or the IQP model, PDD-Max has a
Merlin-Arthur system with quantum polynomial-time Merlin and classical
probabilistic polynomial-time Arthur.Comment: 30 pages, 4 figure
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