DISCRETE APPLIED MATHEMATICS

Dane Flannery

DISCRETE APPLIED MATHEMATICS

Mathematics

Research output: Chapter in Book or Conference Publication/Proceeding › Conference Publication › peer-review

Abstract

This paper locates cocyclic Hadamard matrices within the mainstream of combinatorial design theory. We prove that the existence of a cocyclic Hadamard matrix of order 4t is equivalent to the existence of a normal relative difference set with parameters (4t,2,4t,2t). In the basic case we note there is a corresponding equivalence between coboundary Hadamard matrices and Menon-Hadamard difference sets. These equivalences unify and explain results in the theories of Hadamard groups, divisible designs with regular automorphism groups, and periodic autocorrelation functions. (C) 2000 Elsevier Science B.V. All rights reserved.

Original language	English (Ireland)
Title of host publication	Cocyclic Hadamard matrices and difference sets
Number of pages	15
Volume	102
Publication status	Published - 1 May 2000

Authors (Note for portal: view the doc link for the full list of authors)

Authors
de Launey, W,Flannery, DL,Horadam, KJ

Cite this

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title = "DISCRETE APPLIED MATHEMATICS",

abstract = "This paper locates cocyclic Hadamard matrices within the mainstream of combinatorial design theory. We prove that the existence of a cocyclic Hadamard matrix of order 4t is equivalent to the existence of a normal relative difference set with parameters (4t,2,4t,2t). In the basic case we note there is a corresponding equivalence between coboundary Hadamard matrices and Menon-Hadamard difference sets. These equivalences unify and explain results in the theories of Hadamard groups, divisible designs with regular automorphism groups, and periodic autocorrelation functions. (C) 2000 Elsevier Science B.V. All rights reserved.",

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N2 - This paper locates cocyclic Hadamard matrices within the mainstream of combinatorial design theory. We prove that the existence of a cocyclic Hadamard matrix of order 4t is equivalent to the existence of a normal relative difference set with parameters (4t,2,4t,2t). In the basic case we note there is a corresponding equivalence between coboundary Hadamard matrices and Menon-Hadamard difference sets. These equivalences unify and explain results in the theories of Hadamard groups, divisible designs with regular automorphism groups, and periodic autocorrelation functions. (C) 2000 Elsevier Science B.V. All rights reserved.

AB - This paper locates cocyclic Hadamard matrices within the mainstream of combinatorial design theory. We prove that the existence of a cocyclic Hadamard matrix of order 4t is equivalent to the existence of a normal relative difference set with parameters (4t,2,4t,2t). In the basic case we note there is a corresponding equivalence between coboundary Hadamard matrices and Menon-Hadamard difference sets. These equivalences unify and explain results in the theories of Hadamard groups, divisible designs with regular automorphism groups, and periodic autocorrelation functions. (C) 2000 Elsevier Science B.V. All rights reserved.

M3 - Conference Publication

VL - 102

BT - Cocyclic Hadamard matrices and difference sets

ER -

DISCRETE APPLIED MATHEMATICS

Abstract

Authors (Note for portal: view the doc link for the full list of authors)

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