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Title:
Calamari and Falafl: Logarithmic (Linkable) Ring Signatures from Isogenies and Lattices

Authors: Ward Beullens, Shuichi Katsumata, Federico Pintore

We construct efficient ring signatures from isogeny and lattice assumptions. Our ring signatures are based on a logarithmic OR proof for group actions. We then instantiate this group action by either the CSIDH group action or an MLWE-based group action to obtain our isogeny-based or lattice-based ring signature scheme respectively. Even though this OR proof has a binary challenge space and therefore needs to be repeated a linear number of times, the size of our ring signatures is small and scales better with the ring size N than previously known post-quantum ring signatures. We also construct linkable ring signatures that are almost as efficient as the non-linkable variant. The signature size of our isogeny-based construction is an order of magnitude smaller than all previously known logarithmic post-quantum ring signatures, but is relatively slow (e.g. 5.5 KB signatures and 79 s signing time for rings with 8 members). In comparison, our lattice-based construction is much faster, but has larger signatures (e.g. 30 KB signatures and 90 ms signing time for the same ring size). For small ring sizes our lattice-based ring signatures are slightly larger than state-of-the-art schemes, but they are smaller for ring sizes larger than N \approx 1024.

ePrint: https://eprint.iacr.org/2020/646

Talk: https://www.youtube.com/watch?v=NCTSeI4mP7I

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