Almost p-ary Sequences

Abstract

In this paper we study almost p-ary sequences and their autocorrelation coefficients. We first study the number of distinct out-of-phase autocorrelation coefficients for an almost p-ary sequence of period n+s with s consecutive zero-symbols. We prove an upper bound and a lower bound on . It is shown that can not be less than \s,p,n\. In particular, it is shown that a nearly perfect sequence with at least two consecutive zero symbols does not exist. Next we define a new difference set, partial direct product difference set (PDPDS), and we prove the connection between an almost p-ary nearly perfect sequence of type (γ1, γ2) and period n+2 with two consecutive zero-symbols and a cyclic (n+2,p,n,n-γ2 - 2p+γ2,0,n-γ1 -1p+γ1,n-γ2 - 2p,n-γ1 -1p) PDPDS for arbitrary integers γ1 and γ2. Then we prove a necessary condition on γ2 for the existence of such sequences. In particular, we show that they don't exist for γ2 ≤ -3.