A lower bound on the 2-adic complexity of Ding-Helleseth generalized cyclotomic sequences of period pn

Abstract

Let p be an odd prime, n a positive integer and g a primitive root of pn. Suppose Di(pn)=\g2s+i|s=0,1,2,·s,(p-1)pn-12\, i=0,1, is the generalized cyclotomic classes with Zpn=D0 D1. In this paper, we prove that Gauss periods based on D0 and D1 are both equal to 0 for n≥2. As an application, we determine a lower bound on the 2-adic complexity of a class of Ding-Helleseth generalized cyclotomic sequences of period pn. The result shows that the 2-adic complexity is at least pn-pn-1-1, which is larger than N+12, where N=pn is the period of the sequence.