2,975 research outputs found

    Known-key Distinguisher on Full PRESENT

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    In this article, we analyse the known-key security of the standardized PRESENT lightweight block cipher. Namely, we propose a known-key distinguisher on the full PRESENT, both 80- and 128-bit key versions. We first leverage the very latest advances in differential cryptanalysis on PRESENT, which are as strong as the best linear cryptanalysis in terms of number of attacked rounds. Differential properties are much easier to handle for a known-key distinguisher than linear properties, and we use a bias on the number of collisions on some predetermined input/output bits as distinguishing property. In order to reach the full PRESENT, we eventually introduce a new meet-in-the-middle layer to propagate the differential properties as far as possible. Our techniques have been implemented and verified on the small scale variant of PRESENT. While the known-key security model is very generous with the attacker, it makes sense in practice since PRESENT has been proposed as basic building block to design lightweight hash functions, where no secret is manipulated. Our distinguisher can for example apply to the compression function obtained by placing PRESENT in a Davies-Meyer mode. We emphasize that this is the very first attack that can reach the full number of rounds of the PRESENT block cipher

    Full Round Zero-sum Distinguishers on TinyJAMBU-128 and TinyJAMBU-192 Keyed-permutation in the Known-key setting

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    TinyJAMBU is one of the finalists in the NIST lightweight standardization competition. This paper presents full round practical zero-sum distinguishers on the keyed permutation used in TinyJAMBU. We propose a full round zero-sum distinguisher on the 128- and 192-bit key variants and a reduced round zero-sum distinguisher for the 256-bit key variant in the known-key settings. Our best known-key distinguisher works with 2162^{16} data/time complexity on the full 128-bit version and with 2232^{23} data/time complexity on the full 192-bit version. For the 256-bit ver- sion, we can distinguish 1152 rounds (out of 1280 rounds) in the known- key settings. In addition, we present the best zero-sum distinguishers in the secret-key settings: with complexity 2232^{23} we can distinguish 544 rounds in the forward direction or 576 rounds in the backward direction. For finding the zero-sum distinguisher, we bound the algebraic degree of the TinyJAMBU permutation using the monomial prediction technique proposed by Hu et al. at ASIACRYPT 2020. We model the monomial prediction rule on TinyJAMBU in MILP and find upper bounds on the degree by computing the parity of the number of solutions

    Improved cryptanalysis of skein

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    The hash function Skein is the submission of Ferguson et al. to the NIST Hash Competition, and is arguably a serious candidate for selection as SHA-3. This paper presents the rst third-party analysis of Skein, with an extensive study of its main component: the block cipher Three sh. We notably investigate near collisions, distinguishers, impossible di erentials, key recovery using related-key di erential and boomerang attacks. In particular, we present near collisions on up to 17 rounds, an impossible di erential on 21 rounds, a related-key boomerang distinguisher on 34 rounds, a known-related-key boomerang distinguisher on 35 rounds, and key recovery attacks on up to 32 rounds, out of 72 in total for Threefish-512. None of our attacks directly extends to the full Skein hash. However, the pseudorandomness of Threefish is required to validate the security proofs on Skein, and our results conclude that at least 3

    Related-Key Boomerang Attack on Block Cipher SQUARE

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    Square is 8-round SPN structure block cipher and its round function and key schedule have been slightly modified to design building blocks of Rijndael. Key schedule of Square is simple and efficient but fully affie, so we apply a related-key attack on it. We find a 3-round related-key differential trail with probability 2^28, which have zero differences both on its input and output states, and this trail is called the local collision in [5]. By extending of this related-key differential, we construct a 7-round related-key boomerang distinguisher and successful attack on full round Square. The best attack on Square have ever been known is the square attack on 6-round reduced variant of Square. In this paper, we present a key recovery attack on the full round of Square using a related-key boomerang distinguisher. We construct a 7-round related-key boomerang distinguisher with probability 2^119 by finding local collision, and calculate its probability using ladder switch and local amplification techniques. As a result, one round on top of distinguisher is added to construct a full round attack on Square which recovers 16-bit key information with 2^36 encryptions and 2^123 data

    Cryptanalysis of SPEEDY

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    SPEEDY is a family of ultra-lightweight block ciphers designed by Leander et al. at CHES 2021. There are three recommended variants denoted as SPEEDY-rr-192 with rr∈{5,6,7}. All of them support the 192-bit block and the 192-bit key. The main focus during its design is to ensure hardware-aware low latency, thus, whether it is designed to have enough security is worth to be studied. Recently, the full-round security of SPEEDY-7-192 is announced to be broken by Boura et al. at EUROCRYPT 2023 under the chosen-ciphertext setting, where a round-reduced attack on SPEEDY-6-192 is also proposed. However, no valid attack on SPEEDY-5-192 is given due to its more restricted security parameters. Up to now, the best key recovery attack on this variant only covers 3 rounds proposed by Rohit et al. at AFRICACRYPT 2022. In this paper, we give three full-round attacks on SPEEDY-7-192. Using the divide-and-conquer strategy and other new proposed techniques, we found a 5.5-round differential distinguisher which can be used to mount the first chosen-plaintext full-round key recovery attack. With a similar strategy, we also found a 5-round linear distinguisher which leads to the first full-round attack under the known-plaintext setting. Meanwhile, the 5.5-round differential distinguisher also helps us slightly improve the full-round attack in the chosen-ciphertext setting compared with the previous result. Besides, we also present a 4-round differential attack on SPEEDY-5-192, which is the best attack on this variant in terms of the number of rounds so far. A faster key recovery attack covering the same rounds is also given using a differential-linear distinguisher. Both attacks cannot threaten the full round security of SPEEDY-5-192

    Cryptographic security of quantum key distribution

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    This work is intended as an introduction to cryptographic security and a motivation for the widely used Quantum Key Distribution (QKD) security definition. We review the notion of security necessary for a protocol to be usable in a larger cryptographic context, i.e., for it to remain secure when composed with other secure protocols. We then derive the corresponding security criterion for QKD. We provide several examples of QKD composed in sequence and parallel with different cryptographic schemes to illustrate how the error of a composed protocol is the sum of the errors of the individual protocols. We also discuss the operational interpretations of the distance metric used to quantify these errors.Comment: 31+23 pages. 28 figures. Comments and questions welcom

    Improved Cryptanalysis of Skein

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    The hash function Skein is the submission of Ferguson et al. to the NIST Hash Competition, and is arguably a serious candidate for selection as SHA-3. This paper presents the rst third-party analysis of Skein, with an extensive study of its main component: the block cipher Three sh. We notably investigate near collisions, distinguishers, impossible di erentials, key recovery using related-key di erential and boomerang attacks. In particular, we present near collisions on up to 17 rounds, an impossible di erential on 21 rounds, a related-key boomerang distinguisher on 34 rounds, a known-related-key boomerang distinguisher on 35 rounds, and key recovery attacks on up to 32 rounds, out of 72 in total for Threefish-512. None of our attacks directly extends to the full Skein hash. However, the pseudorandomness of Threefish is required to validate the security proofs on Skein, and our results conclude that at least 3

    Quantum authentication with key recycling

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    We show that a family of quantum authentication protocols introduced in [Barnum et al., FOCS 2002] can be used to construct a secure quantum channel and additionally recycle all of the secret key if the message is successfully authenticated, and recycle part of the key if tampering is detected. We give a full security proof that constructs the secure channel given only insecure noisy channels and a shared secret key. We also prove that the number of recycled key bits is optimal for this family of protocols, i.e., there exists an adversarial strategy to obtain all non-recycled bits. Previous works recycled less key and only gave partial security proofs, since they did not consider all possible distinguishers (environments) that may be used to distinguish the real setting from the ideal secure quantum channel and secret key resource.Comment: 38+17 pages, 13 figures. v2: constructed ideal secure channel and secret key resource have been slightly redefined; also added a proof in the appendix for quantum authentication without key recycling that has better parameters and only requires weak purity testing code

    Using Simon's Algorithm to Attack Symmetric-Key Cryptographic Primitives

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    We present new connections between quantum information and the field of classical cryptography. In particular, we provide examples where Simon's algorithm can be used to show insecurity of commonly used cryptographic symmetric-key primitives. Specifically, these examples consist of a quantum distinguisher for the 3-round Feistel network and a forgery attack on CBC-MAC which forges a tag for a chosen-prefix message querying only other messages (of the same length). We assume that an adversary has quantum-oracle access to the respective classical primitives. Similar results have been achieved recently in independent work by Kaplan et al. Our findings shed new light on the post-quantum security of cryptographic schemes and underline that classical security proofs of cryptographic constructions need to be revisited in light of quantum attackers.Comment: 14 pages, 2 figures. v3: final polished version, more formal definitions adde
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