New families of quaternionic Hadamard matrices

New families of quaternionic Hadamard matrices

A quaternionic Hadamard matrix (QHM) of order n is an n × n matrix H with non-zero entries in the quaternions such that H H ∗ = n I n , where I n and H ∗ denote the identity matrix and the conjugate-transpose of H , respectively. A QHM is dephased if all the entries in its first row and first column...

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Veröffentlicht in:Designs, codes, and cryptography codes, and cryptography, 2024-09, Vol.92 (9), p.2511-2525
Hauptverfasser: Barrera Acevedo, Santiago, Dietrich, Heiko, Lionis, Corey
Format: Artikel
Sprache:eng
Schlagworte:
Coding and Information Theory
Computer Science
Cryptology
Discrete Mathematics in Computer Science
Matrices (mathematics)
Quaternions
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Zusammenfassung:A quaternionic Hadamard matrix (QHM) of order n is an n × n matrix H with non-zero entries in the quaternions such that H H ∗ = n I n , where I n and H ∗ denote the identity matrix and the conjugate-transpose of H , respectively. A QHM is dephased if all the entries in its first row and first column are 1, and it is non-commutative if its entries generate a non-commutative group. The aim of our work is to provide new constructions of infinitely many (non-commutative dephased) QHMs; such matrices are used by Farkas et al. (IEEE Trans Inform Theory 69(6):3814–3824, 2023) to produce mutually unbiased measurements.
ISSN:0925-1022
1573-7586
DOI:10.1007/s10623-024-01401-1