New families of quaternionic Hadamard matrices

Santiago Barrera Acevedo; Heiko Dietrich; Corey Lionis

doi:10.1007/s10623-024-01401-1

New families of quaternionic Hadamard matrices

Santiago Barrera Acevedo, Heiko Dietrich, Corey Lionis

Research output: Contribution to journal › Article › Research › peer-review

2 Citations (Scopus)

Abstract

A quaternionic Hadamard matrix (QHM) of order n is an n×n matrix H with non-zero entries in the quaternions such that HH^∗=nI_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.

Original language	English
Pages (from-to)	2511–2525
Number of pages	15
Journal	Designs Codes and Cryptography
Volume	92
DOIs	https://doi.org/10.1007/s10623-024-01401-1
Publication status	Published - 18 Jun 2024

Keywords

05B20
15B34
Hadamard matrices
Mutually unbiased measurements
Perfect sequences
Quantum codes
Quaternions

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10.1007/s10623-024-01401-1Licence: CC BY

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title = "New families of quaternionic Hadamard matrices",

abstract = "A quaternionic Hadamard matrix (QHM) of order n is an n×n matrix H with non-zero entries in the quaternions such that HH∗=nIn, where In 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.",

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AU - Barrera Acevedo, Santiago

AU - Dietrich, Heiko

AU - Lionis, Corey

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PY - 2024/6/18

Y1 - 2024/6/18

N2 - A quaternionic Hadamard matrix (QHM) of order n is an n×n matrix H with non-zero entries in the quaternions such that HH∗=nIn, where In 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.

AB - A quaternionic Hadamard matrix (QHM) of order n is an n×n matrix H with non-zero entries in the quaternions such that HH∗=nIn, where In 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.

KW - 05B20

KW - 15B34

KW - Hadamard matrices

KW - Mutually unbiased measurements

KW - Perfect sequences

KW - Quantum codes

KW - Quaternions

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DO - 10.1007/s10623-024-01401-1

M3 - Article

AN - SCOPUS:85196141390

SN - 0925-1022

VL - 92

SP - 2511

EP - 2525

JO - Designs Codes and Cryptography

JF - Designs Codes and Cryptography

ER -

New families of quaternionic Hadamard matrices

Abstract

Keywords

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