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STACS
2010
Springer
2010
Springer
Quantum Algorithms for Testing Properties of Distributions
Abstract. Suppose one has access to oracles generating samples from two unknown probability distributions p and q on some N-element set. How many samples does one need to test whether the two distributions are close or far from each other in the L1-norm? This and related questions have been extensively studied during the last years in the field of property testing. In the present paper we study quantum algorithms for testing properties of distributions. It is shown that the L1-distance p−q 1 can be estimated with a constant precision using only O(N1/2 ) queries in the quantum settings, whereas classical computers need Ω(N1−o(1) ) queries. We also describe quantum algorithms for testing Uniformity and Orthogonality with query complexity O(N1/3 ). The classical query complexity of these problems is known to be Ω(N1/2 ). A quantum algorithm for testing Uniformity has been recently independently discovered by Chakraborty et al [14].
Real-time TrafficOracles Generating Samples | Quantum Algorithm | STACS 2010 | Theoretical Computer Science | Unknown Probability Distributions |
Related Content
| Added | 14 May 2010 |
| Updated | 14 May 2010 |
| Type | Conference |
| Year | 2010 |
| Where | STACS |
| Authors | Sergey Bravyi, Aram Wettroth Harrow, Avinatan Hassidim |
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