International Association for Cryptologic Research

International Association
for Cryptologic Research

CryptoDB

Adaptively Secure BLS Threshold Signatures from DDH and co-CDH

Authors:
Sourav Das , University of Illinois at Urbana Champaign
Ling Ren , University of Illinois at Urbana Champaign
Download:
DOI: 10.1007/978-3-031-68394-7_9 (login may be required)
Search ePrint
Search Google
Presentation: Slides
Conference: CRYPTO 2024
Abstract: Threshold signature is one of the most important cryptographic primitives in distributed systems. A popular choice of threshold signature scheme is the BLS threshold signature introduced by Boldyreva (PKC'03). Some attractive properties of Boldyreva's threshold signature are that the signatures are unique and short, the signing process is non-interactive, and the verification process is identical to that of non-threshold BLS. These properties have resulted in its practical adoption in several decentralized systems. However, despite its popularity and wide adoption, up until recently, the Boldyreva scheme has been proven secure only against a static adversary. Very recently, Bacho and Loss (CCS'22) presented the first proof of adaptive security for the Boldyreva scheme, but they have to rely on strong and non-standard assumptions such as the hardness of one-more discrete log (OMDL) and the Algebraic Group Model~(AGM). In this paper, we present the first adaptively secure threshold BLS signature scheme that relies on the hardness of DDH and co-CDH in asymmetric pairing groups in the Random Oracle Model~(ROM). Our signature scheme also has non-interactive signing, compatibility with non-threshold BLS verification, and practical efficiency like Boldyreva's scheme. These properties make our protocol a suitable candidate for practical adoption with the added benefit of provable adaptive security.
BibTeX
@inproceedings{crypto-2024-34370,
  title={Adaptively Secure BLS Threshold Signatures from DDH and co-CDH},
  publisher={Springer-Verlag},
  doi={10.1007/978-3-031-68394-7_9},
  author={Sourav Das and Ling Ren},
  year=2024
}