Logarithmic-Size Post-Quantum Linkable Ring Signatures Based on Aggregation Operations
Minghui Zheng, Shicheng Huang, Deju Kong, Xing Fu, Qiancheng Yao, Wenyi Hou

TL;DR
This paper introduces a new post-quantum linkable ring signature scheme that improves efficiency and privacy for applications like cryptocurrencies.
Contribution
A novel logarithmic-size post-quantum linkable ring signature scheme using aggregation operations instead of zero-knowledge proofs.
Findings
The proposed scheme achieves logarithmic-scale signing and verification operations using a Merkle tree.
It outperforms existing schemes with significantly lower signing and verification times and smaller signature sizes.
The aggregation process ensures strong privacy protection without leaking information about signers.
Abstract
Linkable ring signatures are a type of ring signature scheme that can protect the anonymity of signers while allowing the public to verify whether the same signer has signed the same message multiple times. This functionality makes linkable ring signatures suitable for applications such as cryptocurrencies and anonymous voting systems, achieving the dual goals of identity privacy protection and misuse prevention. However, existing post-quantum linkable ring signature schemes often suffer from issues such as excessive linear data growth the adoption of post-quantum signature algorithms, and high circuit complexity resulting from the use of post-quantum zero-knowledge proof protocols. To address these issues, a logarithmic-size post-quantum linkable ring signature scheme based on aggregation operations is proposed. The scheme constructs a Merkle tree from ring members’ public keys via a…
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Taxonomy
TopicsCryptography and Data Security · Cryptography and Residue Arithmetic · Blockchain Technology Applications and Security
