Binary sequences with low correlation via cyclotomic function fields

Abstract

Due to wide applications of binary sequences with low correlation to communications, various constructions of such sequences have been proposed in literature. However, most of the known constructions via finite fields make use of the multiplicative cyclic group of 2n. It is often overlooked in this community that all 2n+1 rational places (including "place at infinity") of the rational function field over 2n form a cyclic structure under an automorphism of order 2n+1. In this paper, we make use of this cyclic structure to provide an explicit construction of families of binary sequences of length 2n+1 via the finite field 2n. Each family of sequences has size 2n-1 and its correlation is upper bounded by 2(n+2)/2. Our sequences can be constructed explicitly and have competitive parameters. In particular, compared with the Gold sequences of length 2n-1 for even n, we have larger length and smaller correlation although the family size of our sequences is slightly smaller.