On k-error linear complexity of binary sequences derived from Euler quotients modulo 2p
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We consider the k-error linear complexity of binary sequences derived from Eluer quotients modulo 2p (p>3 is an odd prime), recently introduced by J. Zhang and C. Zhao. We adopt certain decimal sequences to determine the values of k-error linear complexity for all k>0. Our results indicate that such sequences have good stability from the viewpoint of cryptography.
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