Title :
A New Algorithm for Solving Ring-LPN With a Reducible Polynomial
Author :
Qian Guo ; Johansson, Thomas ; Londahl, Carl
Author_Institution :
Dept. of Electr. & Inf. Technol., Lund Univ., Lund, Sweden
Abstract :
The learning parity with noise (LPN) problem has recently proved to be of great importance in cryptology. A special and very useful case is the Ring-LPN problem, which typically provides improved efficiency in the constructed cryptographic primitive. We present a new algorithm for solving the Ring-LPN problem in the case when the polynomial used is reducible. It greatly outperforms the previous algorithms for solving this problem. Using the algorithm, we can break the Lapin authentication protocol for the proposed instance using a reducible polynomial, in ~271 bit operations.
Keywords :
cryptographic protocols; polynomials; Lapin authentication protocol; cryptographic primitive; cryptology; learning parity with noise problem; reducible polynomial; ring-LPN problem; Complexity theory; Cryptography; Linear codes; Noise; Polynomials; Protocols; Birthday attacks; Fast Walsh-Hadamard Transform; Fast Walsh-Hardmard Transform; LPN; Lapin; RING-LPN; Ring-LPN;
Journal_Title :
Information Theory, IEEE Transactions on
DOI :
10.1109/TIT.2015.2475738
