Practical Post-Quantum Signature Schemes from Isomorphism Problems of Trilinear Forms
In this paper, we propose a practical signature scheme based on the alternating trilinear form equivalence problem. Our scheme is inspired from the Goldreich-Micali-Wigderson's zero-knowledge protocol for graph isomorphism, and can be served as an alternative candidate for the NIST's post-quantum digital signatures. First, we present theoretical evidences to support its security, especially in the post-quantum cryptography context. The evidences are drawn from several research lines, including hidden subgroup problems, multivariate cryptography, cryptography based on group actions, the quantum random oracle model, and recent advances on isomorphism problems for algebraic structures in algorithms and complexity. Second, we demonstrate its potential for practical uses. Based on algorithm studies, we propose concrete parameter choices, and then implement a prototype. One concrete scheme achieves 128 bit security with public key size ~4100 bytes, signature size ~6800 bytes, and running times (key generation, sign, verify) ~0.8ms on a common laptop computer.