On the correlation distribution of Delsarte–Goethals sequences

Abstract

For odd integer m ≥ 3 and \({t=0,1,\ldots,\frac{m-1}{2}}\), we define Family \({\fancyscript{V}(t)}\) to be a set of size 2^m(t+1) containing binary sequences of period 2^m+1 − 2. The nontrivial correlations between sequences in Family \({\fancyscript{V}(t)}\) are bounded in magnitude by 2 + 2^(m+1)/2+t. Families \({\fancyscript{V}(0)}\) and \({\fancyscript{V}(1)}\) compare favourably to the small and large Kasami sets, respectively. So far, the correlation distribution of Family \({\fancyscript{V}(t)}\) is only known for t = 0. A general framework for computing the correlation distribution of Family \({\fancyscript{V}(t)}\) is established. The correlation distribution of \({\fancyscript{V}(1)}\) is derived, and a way to obtain the correlation distribution of \({\fancyscript{V}(2)}\) is described.