A lower bound on the 2-adic complexity of modified Jacobi sequence

Abstract

Let p,q be distinct primes satisfying gcd(p-1,q-1)=d and let Di, i=0,1,·s,d-1, be Whiteman's generalized cyclotomic classes with Zpq=i=0d-1Di. In this paper, we give the values of Gauss periods based on the generalized cyclotomic sets D0=Σi=0d2-1D2i and D1=Σi=0d2-1D2i+1. As an application, we determine a lower bound on the 2-adic complexity of modified Jacobi sequence. Our result shows that the 2-adic complexity of modified Jacobi sequence is at least pq-p-q-1 with period N=pq. This indicates that the 2-adic complexity of modified Jacobi sequence is large enough to resist the attack of the rational approximation algorithm (RAA) for feedback with carry shift registers (FCSRs).