International Association for Cryptologic Research

International Association
for Cryptologic Research

IACR News item: 04 March 2021

Julien Devevey, Amin Sakzad, Damien Stehlé, Ron Steinfeld
ePrint Report ePrint Report
Several recent proposals of efficient public-key encryption are based on variants of the polynomial learning with errors problem ($\mathsf{PLWE}^f$) in which the underlying polynomial ring $\mathbb{Z}_q[x]/f$ \ is replaced with the (related) modular integer ring $\mathbb{Z}_{f(q)}$; the corresponding problem is known as Integer Polynomial Learning with Errors ($\mathsf{I-PLWE}^f$). Cryptosystems based on $\mathsf{I-PLWE}^f$ and its variants can exploit optimised big-integer arithmetic to achieve good practical performance, as exhibited by the $\mathsf{ThreeBears}$ cryptosystem. Unfortunately, the average-case hardness of $\mathsf{I-PLWE}^f$ and its relation to more established lattice problems have to date remained unclear.

We describe the first polynomial-time average-case reductions for the search variant of $\mathsf{I-PLWE}^f$, proving its computational equivalence with the search variant of its counterpart problem $\mathsf{PLWE}^f$. Our reductions apply to a large class of defining polynomials $f$. To obtain our results, we employ a careful adaptation of Rényi divergence analysis techniques to bound the impact of the integer ring arithmetic carries on the error distributions. As an application, we present a deterministic public-key cryptosystem over integer rings. Our cryptosystem, which resembles $\mathsf{ThreeBears}$, enjoys one-way (OW-CPA) security provably based on the search variant of $\mathsf{I-PLWE}^f$.
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