Martin R. Albrecht
King's College London and SandboxAQ

Benjamin Benčina
Royal Holloway, University of London

Russell W. F. Lai
Aalto University

Keywords:

Abstract

Updatable public-key encryption (UPKE) allows anyone to update a public key while simultaneously producing an update token, given which the secret key holder could consistently update the secret key. Furthermore, ciphertexts encrypted under the old public key remain secure even if the updated secret key is leaked -- a property much desired in secure messaging. All existing lattice-based constructions of UPKE update keys by a noisy linear shift. As the noise accumulates, these schemes either require super-polynomial-size moduli or an a priori bounded number of updates to maintain decryption correctness.

Inspired by recent works on cryptography based on the lattice isomorphism problem, we propose an alternative way to update keys in lattice-based UPKE. Instead of shifting, we rotate them. As rotations do not induce norm growth, our construction supports an unbounded number of updates with a polynomial-size modulus. The security of our scheme is based on the LWE assumption over hollow matrices -- matrices which generate linear codes with non-trivial hull -- and the hardness of permutation code equivalence. Along the way, we also show that LWE over hollow matrices is as hard as LWE over uniform matrices, and that a leftover hash lemma holds for hollow matrices.