6533b7d1fe1ef96bd125d5cb

RESEARCH PRODUCT

Quantum Queries on Permutations

Taisia Mischenko-slatenkovaRūsiņš FreivaldsAlina VasilievaIlja Kucevalovs

subject

CombinatoricsQuantization (physics)Quantum parallelismQuantum queryPermutationMathematics::CombinatoricsGroup (mathematics)Computer Science::Information RetrievalQuantumComputer Science::DatabasesMathematics

description

K. Iwama and R. Freivalds considered query algorithms where the black box contains a permutation. Since then several authors have compared quantum and deterministic query algorithms for permutations. It turns out that the case of \(n\)-permutations where \(n\) is an odd number is difficult. There was no example of a permutation problem where quantization can save half of the queries for \((2m+1)\)-permutations if \(m\ge 2\). Even for \((2m)\)-permutations with \(m\ge 2\), the best proved advantage of quantum query algorithms is the result by Iwama/Freivalds where the quantum query complexity is \(m\) but the deterministic query complexity is \((2m-1)\). We present a group of \(5\)-permutations such that the deterministic query complexity is 4 and the quantum query complexity is 2.

yearjournalcountryeditionlanguage
2015-01-01
https://doi.org/10.1007/978-3-319-19225-3_15