International Association for Cryptologic Research

International Association
for Cryptologic Research


Practical Schnorr Threshold Signatures Without the Algebraic Group Model

Hien Chu , Friedrich-Alexander-Universität Erlangen-Nürnberg
Paul Gerhart , Friedrich-Alexander-University Erlangen-Nürnberg
Tim Ruffing , Blockstream Research
Dominique Schröder , Friedrich-Alexander-Universität Erlangen-Nürnberg
DOI: 10.1007/978-3-031-38557-5_24 (login may be required)
Search ePrint
Search Google
Presentation: Slides
Conference: CRYPTO 2023
Abstract: Threshold signatures are digital signature schemes in which a set of n signers specify a threshold t such that any subset of size t is authorized to produce signatures on behalf of the group. There has recently been a renewed interest in this primitive, largely driven by the need to secure highly valuable signing keys, e.g., DNSSEC keys or keys protecting digital wallets in the cryptocurrency ecosystem. Of special interest is FROST, a practical Schnorr threshold signature scheme, which is currently undergoing standardization in the IETF and whose security was recently analyzed at CRYPTO'22. We continue this line of research by focusing on FROST's unforgeability combined with a practical distributed key generation (DKG) algorithm. Existing proofs of this setup either use non-standard heuristics, idealized group models like the AGM, or idealized key generation. Moreover, existing proofs do not consider all practical relevant optimizations that have been proposed. We close this gap between theory and practice by presenting the Schnorr threshold signature scheme Olaf, which combines the most efficient known FROST variant FROST3 with a variant of Pedersen's DKG protocol (as commonly used for FROST), and prove its unforgeability. Our proof relies on the AOMDL assumption (a weaker and falsifiable variant of the OMDL assumption) and, like proofs of regular Schnorr signatures, on the random oracle model.
  title={Practical Schnorr Threshold Signatures Without the Algebraic Group Model},
  author={Hien Chu and Paul Gerhart and Tim Ruffing and Dominique Schröder},