International Association for Cryptologic Research (IACR)
Abstract
In this work, we propose two novel succinct one-out-of-many proofs from coding theory, which can be seen as extensions of the Stern\u27s framework and Veron\u27s framework from proving knowledge of a preimage to proving knowledge of a preimage for one element in a set, respectively. The size of each proof is short and scales better with the size of the public set than the code-based accumulator in \cite{nguyen2019new}. Based on our new constructions, we further present a logarithmic-size ring signature scheme and a logarithmic-size group signature scheme. Our schemes feature a short signature size, especially our group signature. To our best knowledge, it is the most compact code-based group signature scheme so far. At 128-bit security level, our group signature size is about 144 KB for a group with 220 members while the group signature size of the previously most compact code-based group signature constructed by the above accumulator exceeds 3200 KB
