[Resource Topic] 2018/226: Non-Uniform Bounds in the Random-Permutation, Ideal-Cipher, and Generic-Group Models

Welcome to the resource topic for 2018/226

Title:
Non-Uniform Bounds in the Random-Permutation, Ideal-Cipher, and Generic-Group Models

Authors: Sandro Coretti, Yevgeniy Dodis, Siyao Guo

Abstract:

The random-permutation model (RPM) and the ideal-cipher model (ICM) are idealized models that offer a simple and intuitive way to assess the conjectured standard-model security of many important symmetric-key and hash-function constructions. Similarly, the generic-group model (GGM) captures generic algorithms against assumptions in cyclic groups by modeling encodings of group elements as random injections and allows to derive simple bounds on the advantage of such algorithms. Unfortunately, both well-known attacks, e.g., based on rainbow tables (Hellman, IEEE Transactions on Information Theory '80), and more recent ones, e.g., against the discrete-logarithm problem (Corrigan-Gibbs and Kogan, EUROCRYPT '18), suggest that the concrete security bounds one obtains from such idealized proofs are often completely inaccurate if one considers non-uniform or preprocessing attacks in the standard model. To remedy this situation, this work 1) defines the auxiliary-input (AI) RPM/ICM/GGM, which capture both non-uniform and preprocessing attacks by allowing an attacker to leak an arbitrary (bounded-output) function of the oracle’s function table; 2) derives the first non-uniform bounds for a number of important practical applications in the AI-RPM/ICM, including constructions based on the Merkle-Damgard and sponge paradigms, which underly the SHA hashing standards, and for AI-RPM/ICM applications with computational security; and 3) using simpler proofs, recovers the AI-GGM security bounds obtained by Corrigan-Gibbs and Kogan against preprocessing attackers, for a number of assumptions related to cyclic groups, such as discrete logarithms and Diffie-Hellman problems, and provides new bounds for two assumptions. An important step in obtaining these results is to port the tools used in recent work by Coretti et al. (EUROCRYPT '18) from the ROM to the RPM/ICM/GGM, resulting in very powerful and easy-to-use tools for proving security bounds against non-uniform and preprocessing attacks.

ePrint: https://eprint.iacr.org/2018/226

Talk: https://www.youtube.com/watch?v=oUuxCw4-atY

Slides: https://crypto.iacr.org/2018/slides/Non-Uniform%20Bounds%20in%20the%20Random-Permutation,%20Ideal-Cipher,%20and%20Generic-Group%20Models.pdf

See all topics related to this paper.

Feel free to post resources that are related to this paper below.

Example resources include: implementations, explanation materials, talks, slides, links to previous discussions on other websites.

For more information, see the rules for Resource Topics .