Post-Quantum -to-1 Trapdoor Claw-free Functions from Extrapolated Dihedral Cosets

Abstract

Noisy trapdoor claw-free function (NTCF) as a powerful post-quantum cryptographic tool can efficiently constrain actions of untrusted quantum devices. However, the original NTCF is essentially 2-to-1 one-way function (NTCF12). In this work, we attempt to further extend the NTCF12 to achieve many-to-one trapdoor claw-free functions with polynomial bounded preimage size. Specifically, we focus on a significant extrapolation of NTCF12 by drawing on extrapolated dihedral cosets, thereby giving a model of NTCF1 where is a polynomial integer. Then, we present an efficient construction of NTCF1 assuming quantum hardness of the learning with errors (LWE) problem. We point out that NTCF can be used to bridge the LWE and the dihedral coset problem (DCP). By leveraging NTCF12 (resp. NTCF1), our work reveals a new quantum reduction path from the LWE problem to the DCP (resp. extrapolated DCP). Finally, we demonstrate the NTCF1 can naturally be reduced to the NTCF12, thereby achieving the same application for proving the quantumness.

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