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Title:
Non-adaptive One-Way to Hiding not only Implies Adaptive Quantum Reprogramming, but also Does Better
Authors: Heming Liao, Jiangxia Ge, Rui Xue
Abstract:As three frequently used techniques for adaptive reprogramming in the QROM, the adaptive One-Way to Hiding (O2H) proposed by Unruh (CRYPTO 2014), the GHHM adaptive reprogramming proposed by Grilo et al. (ASIACRYPT 2021), and the Pan-Zeng adaptive reprogramming proposed by Pan and Zeng (PKC 2024), address different reprogramming scenarios, and do not appear to imply one another. A recent breakthrough by Jaeger (ASIACRYPT 2025) reveals a surprising connection: all three of these adaptive techniques can be implied by a non-adaptive reprogramming technique called Fixed-Permutation O2H (FP-O2H). Furthermore, Jaeger’s result also improves the security bounds for Unruh’s adaptive O2H and the Pan-Zeng adaptive reprogramming theorem.
In this paper, we reconsider the implication between FP-O2H and GHHM adaptive reprogramming. We first introduce a variant of FP-O2H, called the Double-Oracle-Fixed-Permutation O2H (DOFP-O2H). Then, by applying this variant, we derive a tighter upper bound for the GHHM adaptive reprogramming. Thereby, our result complements Jaeger’s findings by addressing the final piece, showing that the non-adaptive O2H not only implies adaptive reprogramming in the QROM but also yields tighter upper bounds. In addition, a direct application of our tighter GHHM adaptive reprogramming yields a tighter \textsf{EUF-CMA} security proof of the Fiat–Shamir transform in the QROM: the security loss with respect to the number of signing queries q_s decreases from O(q_s) to O(\sqrt{q_s}).
Furthermore, we reconsider the implication between FP-O2H and the ABKM permutation resampling proposed by Alagic et al. (EUROCRYPT 2022). By applying our DOFP-O2H, we reprove the ABKM permutation resampling theorem, and derive the same upper bound as that of Alagic et al. This result suggests that the FP-O2H not only can be applied to analyze the reprogramming in the QROM, but also has potential for analyzing reprogramming in the random permutation setting.
ePrint: https://eprint.iacr.org/2025/1998
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