6533b86efe1ef96bd12cbf7e

RESEARCH PRODUCT

Efficient Quantum Algorithms for (Gapped) Group Testing and Junta Testing

A. AmbainisA. BelovsO. RegevR. De WolfR. Krauthgamer

subject

FOS: Computer and information sciencesComputer Science - Computational ComplexityQuantum Physics0103 physical sciencesFOS: Physical sciences010307 mathematical physicsComputational Complexity (cs.CC)Computer Science::Computational ComplexityQuantum Physics (quant-ph)010306 general physics01 natural sciences

description

In the k-junta testing problem, a tester has to efficiently decide whether a given function f: {0, 1}n → {0, 1} is a k-junta (i.e., depends on at most fc of its input bits) or is ε-far from any k-junta. Our main result is a quantum algorithm for this problem with query complexity Õ([EQUATION]) and time complexity Õ(n[EQUATION]). This quadratically improves over the query complexity of the previous best quantum junta tester, due to Atıcı and Servedio. Our tester is based on a new quantum algorithm for a gapped version of the combinatorial group testing problem, with an up to quartic improvement over the query complexity of the best classical algorithm. For our upper bound on the time complexity we give a near-linear time implementation of a shallow variant of the quantum Fourier transform over the symmetric group, similar to the Schur-Weyl transform. We also prove a lower bound of Ω(k1/3) queries for junta-testing (for constant ε).

yearjournalcountryeditionlanguage
2015-07-11
http://arxiv.org/abs/1507.03126