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A Note on Quantum Divide and Conquer for Minimal String Rotation (2210.09149v2)

Published 17 Oct 2022 in quant-ph and cs.DS

Abstract: Lexicographically minimal string rotation is a fundamental problem in string processing that has recently garnered significant attention in quantum computing. Near-optimal quantum algorithms have been proposed for solving this problem, utilizing a divide-and-conquer structure. In this note, we show that its quantum query complexity is $\sqrt{n} \cdot 2^{{O(\sqrt{\log} n})}$, improving the prior result of $\sqrt{n} \cdot 2^{(\log n)^{{1/2+\varepsilon}}$} due to Akmal and Jin (SODA 2022). Notably, this improvement is quasi-polylogarithmic, which is achieved by only logarithmic level-wise optimization using fault-tolerant quantum minimum finding.

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