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Conference Papers Year : 2022

Entropic Hardness of Module-LWE from Module-NTRU

Abstract

The Module Learning With Errors problem (M-LWE) has gained popularity in recent years for its security-efficiency balance, and its hardness has been established for a number of variants. In this paper, we focus on proving the hardness of (search) M-LWE for general secret distributions, provided they carry sufficient min-entropy. This is called entropic hardness of M-LWE. First, we adapt the line of proof of Brakerski and Döttling on R-LWE (TCC'20) to prove that the existence of certain distributions implies the entropic hardness of M-LWE. Then, we provide one such distribution whose required properties rely on the hardness of the decisional Module-NTRU problem.
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Dates and versions

hal-04028179 , version 1 (14-03-2023)

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Katharina Boudgoust, Corentin Jeudy, Adeline Roux-Langlois, Weiqiang Wen. Entropic Hardness of Module-LWE from Module-NTRU. Indocrypt, Dec 2022, Kolkata, India. pp.78 - 99, ⟨10.1007/978-3-031-22912-1_4⟩. ⟨hal-04028179⟩
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