Hash Function Luffa Supporting Document
نویسندگان
چکیده
منابع مشابه
Finding Collisions for Reduced Luffa-256 v2
Luffa is a family of cryptographic hash functions that has been selected as a second round SHA-3 candidate. This paper presents the first collision finding analysis of Luffa-256 v2 which is the 256-bit hash function in the Luffa family. We show that collisions for 4 out of 8 steps of Luffa can be found with complexity 2 using sophisticated message modification techniques. Furthermore, we presen...
متن کاملHigher-Order Differential Properties of Keccak and Luffa
In this paper, we identify higher-order differential and zero-sum properties in the full Keccak-f permutation, in the Luffa v1 hash function, and in components of the Luffa v2 algorithm. These structural properties rely on a new bound on the degree of iterated permutations with a nonlinear layer composed of parallel applications of smaller balanced Sboxes. These techniques yield zero-sum partit...
متن کاملOn the Indifferentiability of Fugue and Luffa
Indifferentiability is currently considered to be an important security notion for a cryptographic hash function to instantiate Random Oracles in different security proofs. In this paper, we prove indifferentiability of Fugue and Luffa, two SHA3 second round candidates. We also analyze the indifferentiability of a modified Luffa mode replacing multiple small permutations by a single large permu...
متن کاملImproving the performance of Luffa Hash Algorithm
Luffa is a new hash algorithm that has been accepted for round two of the NIST hash function competition SHA-3. Computational efficiency is the second most important evaluation criteria used to compare candidate algorithms. In this paper, we describe a fast software implementation of the Luffa hash algorithm for the Intel Core 2 Duo platform. We explore the use of the perfect shuffle operation ...
متن کاملHigher Order Differential Attack on Step-Reduced Variants of Luffa v1
In this paper, a higher order differential attack on the hash function Luffa v1 is discussed. We confirmed that the algebraic degree of the permutation Qj which is an important non-linear component of Luffa grows slower than an ideal case both by the theoretical and the experimental approaches. According to our estimate, we can construct a distinguisher for step-reduced variants of Luffa v1 up ...
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