4-Adic Complexity of Interleaved Quaternary Sequences

Abstract

Tang and Ding X. Tang present a series of quaternary sequences w(a, b) interleaved by two binary sequences a and b with ideal autocorrelation and show that such interleaved quaternary sequences have optimal autocorrelation. In this paper we consider the 4-adic complexity FCw(4) of such quaternary sequence w=w(a, b). We present a general formula on FCw(4), w=w(a, b). As a direct consequence, we obtain a general lower bound FCw(4)≥4(4n-1) where 2n is the period of the sequence w. By taking a and b to be several types of known binary sequences with ideal autocorrelation (m-sequences, twin-prime, Legendre, Hall sequences and their complement, shift or sample sequences), we compute the exact values of FCw(4), w=w(a, b) and show that in most cases FCw(4) reaches or nearly reaches the maximum value 4(42n-1). Our results show that the 4-adic complexity of the quaternary sequences defined in X. Tang are large enough to resist the attack of the rational approximation algorithm.