Skip to main content
placeholder image

New classes of orthogonal designs constructed from complementary sequences with given spread

Journal Article


Download full-text (Open Access)

Abstract


  • In this paper we present infinite families of new orthogonal designs, based on some weighing matrices of order 2n, weight 2n – k and spread σ, constructed from two circulants and directed sequences.

UOW Authors


  •   Kotsireas, Ilias S. (external author)
  •   Koukouvinos, Christos (external author)
  •   Seberry, Jennifer
  •   Simos, D E. (external author)

Publication Date


  • 2010

Citation


  • Kotsireas, I. S., Koukouvinos, C., Seberry, J. & Simos, D. E. (2010). New classes of orthogonal designs constructed from complementary sequences with given spread. Australasian Journal of Combinatorics, 46 67-78.

Scopus Eid


  • 2-s2.0-77952377225

Ro Full-text Url


  • http://ro.uow.edu.au/cgi/viewcontent.cgi?article=10725&context=infopapers

Ro Metadata Url


  • http://ro.uow.edu.au/infopapers/3389

Has Global Citation Frequency


Number Of Pages


  • 11

Start Page


  • 67

End Page


  • 78

Volume


  • 46

Abstract


  • In this paper we present infinite families of new orthogonal designs, based on some weighing matrices of order 2n, weight 2n – k and spread σ, constructed from two circulants and directed sequences.

UOW Authors


  •   Kotsireas, Ilias S. (external author)
  •   Koukouvinos, Christos (external author)
  •   Seberry, Jennifer
  •   Simos, D E. (external author)

Publication Date


  • 2010

Citation


  • Kotsireas, I. S., Koukouvinos, C., Seberry, J. & Simos, D. E. (2010). New classes of orthogonal designs constructed from complementary sequences with given spread. Australasian Journal of Combinatorics, 46 67-78.

Scopus Eid


  • 2-s2.0-77952377225

Ro Full-text Url


  • http://ro.uow.edu.au/cgi/viewcontent.cgi?article=10725&context=infopapers

Ro Metadata Url


  • http://ro.uow.edu.au/infopapers/3389

Has Global Citation Frequency


Number Of Pages


  • 11

Start Page


  • 67

End Page


  • 78

Volume


  • 46