On the k-error linear complexity of binary sequences derived from polynomial quotients

Abstract

We investigate the k-error linear complexity of p2-periodic binary sequences defined from the polynomial quotients (including the well-studied Fermat quotients), which is defined by qp,w(u) uw-uwpp p ~ with 0 qp,w(u) p-1, ~u 0, where p is an odd prime and 1 w<p. Indeed, first for all integers k, we determine exact values of the k-error linear complexity over the finite field 2 for these binary sequences under the assumption of f2 being a primitive root modulo p2, and then we determine their k-error linear complexity over the finite field p for either 0 k<p when w=1 or 0 k<p-1 when 2 w<p. Theoretical results obtained indicate that such sequences possess `good' error linear complexity.