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Lattice trapdoor algorithms allow us to sample hard random lattices together with their trapdoors, given which short lattice vectors can be sampled efficiently. This enables a wide range of advanced cryptographic primitives. In this work, we ask: can we distribute lattice trapdoor algorithms non-interactively?
We study a natural approach to sharing lattice trapdoors: splitting them into partial trapdoors for different lower-rank sublattices which allow the local sampling of short sublattice vectors. Given sufficiently many short sublattice vectors, these can then be combined to yield short vectors in the original lattice. Moreover, this process can be repeated an unbounded polynomial number of times without needing a party holding a full trapdoor to intervene. We further define one-wayness and indistinguishability properties for partial trapdoors.
We establish that such objects exist that have non-trivial performance under standard assumptions. Specifically, we prove these properties for a simple construction from the κ-SIS and κ-LWE assumptions, which were previously shown to be implied by the plain SIS and LWE assumptions, respectively. The security proofs extend naturally to the ring or module settings under the respective analogues of these assumptions, which have been conjectured to admit similar reductions.
Our partial trapdoors achieve non-trivial efficiency, with relevant parameters sublinear in the number of shareholders. Our construction is algebraic, without resorting to generic tools such as multiparty computation or fully homomorphic encryption. Consequently, a wide range of lattice-trapdoor-based primitives can be thresholdised non-interactively by simply substituting the trapdoor preimage sampling procedure with our partial analogue.
