An Algebraic Framework for Diffie–Hellman Assumptions

We put forward a new algebraic framework to generalize and analyze Diffie–Hellman like decisional assumptions which allows us to argue about security and applications by considering only algebraic properties. Our D ℓ , k - MDDH Assumption states that it is hard to decide whether a vector in G ℓ is l...

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Veröffentlicht in:	Journal of cryptology Jg. 30; H. 1; S. 242 - 288
Hauptverfasser:	Escala, Alex, Herold, Gottfried, Kiltz, Eike, Ràfols, Carla, Villar, Jorge
Format:	Journal Article Verlag
Sprache:	Englisch
Veröffentlicht:	New York Springer US 01.01.2017 Springer Nature B.V
Schlagworte:	11 Number theory 11Y Computational number theory Algebra Classificació AMS Coding and Information Theory Columns (structural) Combinatorics Communications Engineering Computational Mathematics and Numerical Analysis Computer Science Decision analysis Diffie-Hellman Assumption Encryption Functions (mathematics) Generic Hardness Groth-Sahai proofs Hash Proof Systems Matemàtiques i estadística Mathematical analysis Networks Nombres, Teoria dels Number theory Probability Theory and Stochastic Processes Public-key Encryption Teoria de nombres Àlgebra Àrees temàtiques de la UPC Diffie–Hellman assumption Public-key encryption Groth–Sahai proofs Hash proof systems Generic hardness
ISSN:	0933-2790, 1432-1378
Online-Zugang:	Volltext
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Zusammenfassung:	We put forward a new algebraic framework to generalize and analyze Diffie–Hellman like decisional assumptions which allows us to argue about security and applications by considering only algebraic properties. Our D ℓ , k - MDDH Assumption states that it is hard to decide whether a vector in G ℓ is linearly dependent of the columns of some matrix in G ℓ × k sampled according to distribution D ℓ , k . It covers known assumptions such as DDH , 2 - Lin (Linear Assumption) and k - Lin (the k -Linear Assumption). Using our algebraic viewpoint, we can relate the generic hardness of our assumptions in m -linear groups to the irreducibility of certain polynomials which describe the output of D ℓ , k . We use the hardness results to find new distributions for which the D ℓ , k - MDDH Assumption holds generically in m -linear groups. In particular, our new assumptions 2 - SCasc and 2 - ILin are generically hard in bilinear groups and, compared to 2 - Lin , have shorter description size, which is a relevant parameter for efficiency in many applications. These results support using our new assumptions as natural replacements for the 2 - Lin assumption which was already used in a large number of applications. To illustrate the conceptual advantages of our algebraic framework, we construct several fundamental primitives based on any MDDH Assumption. In particular, we can give many instantiations of a primitive in a compact way, including public-key encryption, hash proof systems, pseudo-random functions, and Groth–Sahai NIZK and NIWI proofs. As an independent contribution, we give more efficient NIZK and NIWI proofs for membership in a subgroup of G ℓ . The results imply very significant efficiency improvements for a large number of schemes.
Bibliographie:	ObjectType-Article-1 SourceType-Scholarly Journals-1 ObjectType-Feature-2 content type line 14
ISSN:	0933-2790 1432-1378
DOI:	10.1007/s00145-015-9220-6