Permutation Superposition Oracles for Quantum Query Lower Bounds

July 12, 2024 Β· Declared Dead Β· πŸ› IACR Cryptology ePrint Archive

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Authors Christian Majenz, Giulio Malavolta, Michael Walter arXiv ID 2407.09655 Category quant-ph: Quantum Computing Cross-listed cs.CR Citations 13 Venue IACR Cryptology ePrint Archive Last Checked 4 months ago
Abstract
We propose a generalization of Zhandry's compressed oracle method to random permutations, where an algorithm can query both the permutation and its inverse. We show how to use the resulting oracle simulation to bound the success probability of an algorithm for any predicate on input-output pairs, a key feature of Zhandry's technique that had hitherto resisted attempts at generalization to random permutations. One key technical ingredient is to use strictly monotone factorizations to represent the permutation in the oracle's database. As an application of our framework, we show that the one-round sponge construction is unconditionally preimage resistant in the random permutation model. This proves a conjecture by Unruh.
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