Systematic Constructions of Complementary Sets and Hadamard Matrices from Circulant Operator

Abstract

A Hadamard matrix H of order n is a square matrix with entries 1 satisfying HHT = nIn, where In is the identity matrix of order n. A circulant Hadamard matrix is a Hadamard matrix whose rows are cyclic shifts of one another. This work establishes a unified algebraic framework that treats arbitrary Hadamard matrices as flexible seeds to systematically generate Golay complementary sets (GCS), cross Z-complementary sets (CZCS), complete complementary codes (CCC), and optimal cross-Z complementary sequence sets (CZCSS) through algebraic transformations. In this paper, a systematic framework using cyclic operators is presented. First, circulant Hadamard matrices of order 4 are utilized recursively to propose binary CZCS of arbitrary lengths, achieving a maximum ZCZ ratio of 2/3, and binary GCS. Significantly, this framework is generalized to establish that by employing binary or complex Hadamard matrices of any order, binary or non-binary CZCSs of arbitrary lengths can be constructed with a ZCZ ratio of 1/2. Furthermore, to provide flexible user capacity, an alternative construction of binary GCS of all lengths and Hadamard matrices of order 2a+1 10b 26c (a, b, c ≥ 0) is proposed using circulant matrices and Golay complementary pairs (GCP). These constructions are further extended to form binary CCC with parameters (2N, 2N, 2N), where N=2a 10b 26c, and (4n, 4n, 4n) for n ≥ 1. Additionally, optimal binary (8n, 8n, 8n, 4n)-CZCSS and their complex versions with parameters (2m, 2m, 2m, m) are proposed for n, m ≥ 1. These results provide the first generalized framework for constructing optimal CZCSS from arbitrary Hadamard seeds. Finally, a theoretical relation between Hadamard matrices and GCSs is established, and fundamental properties of circulant matrices over aperiodic correlation functions are presented.