Shorter lattice-based zero-knowledge proofs for the correctness of a shuffle

Abstract

In an electronic voting procedure, mixing networks are used to ensure anonymity of the casted votes. Each node of the network re-encrypts the input list of ciphertexts and randomly permutes it in a process named shuffle, and must prove (in zero-knowledge) that the process was applied honestly. To maintain security of such a process in a post-quantum scenario, new proofs are based on different mathematical assumptions, such as lattice-based problems. Nonetheless, the best lattice-based protocols to ensure verifiable shuffling have linear communication complexity on N, the number of shuffled ciphertexts. In this paper we propose the first sub-linear (on N) post-quantum zero-knowledge argument for the correctness of a shuffle, for which we have mainly used two ideas: arithmetic circuit satisfiability results from Baum et al. (CRYPTO'2018) and Beneš networks to model a permutation of N elements. The achieved communication complexity of our protocol with respect to N is O(v(N)log^2(N)), but we will also highlight its dependency on other important parameters of the underlying lattice ingredients.The work is partially supported by the Spanish Ministerio de Ciencia e Innovaci´on (MICINN), under Project PID2019-109379RB-I00 and by the European Union PROMETHEUS project (Horizon 2020 Research and Innovation Program, grant 780701). Authors thank Tjerand Silde for pointing out an incorrect set of parameters (Section 4.1) that we had proposed in a previous version of the manuscript.Postprint (author's final draft