
























, Institute for Advancing Intelligence (IAI), TCG CREST, Ramakrishna Mission Vivekananda Educational and Research Institute, Belur
Avijit Dutta, Institute for Advancing Intelligence (IAI), TCG CREST, Academy of Scientific and Innovative Research (AcSIR), Ghaziabad
Kazuhiko Minematsu, NEC Corporation, Kawasaki
In EUROCRYPT'20, Bao et al. have proved that three rounds of cascaded LRW1 construction provide security up to $2^{2n/3}$ queries. However, in a recent work by Khairallah et al., it has been shown that the construction provides only birthday bound security via exhibiting a distinguishing attack on the construction, and thereby invalidating the claim of Bao et al. In an independent and contemporaneous work, Datta et al. have shown that four rounds of cascading of the $\textsf{LRW1}$ construction, dubbed as $\textsf{CLRW1}^4$—based on four independent keyed block ciphers—achieves $3n/4$-bit CCA security. In this paper, we have shown that a key reduced variant of the $\textsf{CLRW1}^4$ construction, dubbed as $\textsf{R}\mbox{-}\textsf{CLRW1}^4$ based on two independent keyed block ciphers, achieves $2n/3$-bit CCA security. The security proof of our construction relies on a heavy use of the H-Coefficient technique and non-trivial analysis in lower-bounding the real interpolation probability for good transcripts.
Note: This paper has been accepted in Designs, Codes and Cryptography (DCC), 2025, under the title “Two-Key Variant of the Four-Round Cascading LRW1”.
BibTeX
@misc{cryptoeprint:2025/1678,
author = {Shreya Dey and Avijit Dutta and Kazuhiko Minematsu},
title = {Two-Key Variant of the Four-Round Cascading {LRW1}},
howpublished = {Cryptology {ePrint} Archive, Paper 2025/1678},
year = {2025},
url = {https://eprint.iacr.org/2025/1678}
}
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