Contributions to Proceedings:
B. Bauer, G. Fuchsbauer, A. Plouviez:
"The One-More Discrete Logarithm Assumption in the Generic Group Model";
in: "Advances in Cryptology - ASIACRYPT 2021",
Lecture Notes in Computer Science, vol 13093;
Springer,
Springer Link,
2021,
ISBN: 978-3-030-92067-8,
587
- 617.
English abstract:
The one more-discrete logarithm assumption (OMDL) underlies the security analysis of identification protocols, blind signature and multi-signature schemes, such as blind Schnorr signatures and the recent MuSig2 multi-signatures. As these schemes produce standard Schnorr signatures, they are compatible with existing systems, e.g. in the context of blockchains. OMDL is moreover assumed for many results on the impossibility of certain security reductions.
Despite its wide use, surprisingly, OMDL is lacking any rigorous analysis; there is not even a proof that it holds in the generic group model (GGM). (We show that a claimed proof is flawed.) In this work we give a formal proof of OMDL in the GGM. We also prove a related assumption, the one-more computational Diffie-Hellman assumption, in the GGM. Our proofs deviate from prior GGM proofs and replace the use of the Schwartz-Zippel Lemma by a new argument.
Keywords:
One-more discrete logarithm Generic group model Blind signatures Multi-signatures
"Official" electronic version of the publication (accessed through its Digital Object Identifier - DOI)
http://dx.doi.org/10.1007/978-3-030-92068-5_20
Electronic version of the publication:
https://publik.tuwien.ac.at/files/publik_296929.pdf
Created from the Publication Database of the Vienna University of Technology.