Golay Complementary Sequences of Arbitrary Length and Asymptotic Existence of Hadamard Matrices

Abstract

In this work, we construct 4-phase Golay complementary sequence (GCS) set of cardinality 23+ 2 r with arbitrary sequence length n, where the 1013-base expansion of n has r nonzero digits. Specifically, the GCS octets (eight sequences) cover all the lengths no greater than 1013. Besides, based on the representation theory of signed symmetric group, we construct Hadamard matrices from some special GCS to improve their asymptotic existence: there exist Hadamard matrices of order 2t m for any odd number m, where t = 6 1402m + 10.