English

Some Constructions for Amicable Orthogonal Designs

Combinatorics 2015-09-15 v1

Abstract

Hadamard matrices, orthogonal designs and amicable orthogonal designs have a number of applications in coding theory, cryptography, wireless network communication and so on. Product designs were introduced by Robinson in order to construct orthogonal designs especially full orthogonal designs (no zero entries) with maximum number of variables for some orders. He constructed product designs of orders 44, 88 and 1212 and types (1(3);1(3);1),\big(1_{(3)}; 1_{(3)}; 1\big), (1(3);1(3);5)\big(1_{(3)}; 1_{(3)}; 5\big) and (1(3);1(3);9)\big(1_{(3)}; 1_{(3)}; 9\big), respectively. In this paper, we first show that there does not exist any product design of order n4n\neq 4, 88, 1212 and type (1(3);1(3);n3),\big(1_{(3)}; 1_{(3)}; n-3\big), where the notation u(k)u_{(k)} is used to show that uu repeats kk times. Then, following the Holzmann and Kharaghani's methods, we construct some classes of disjoint and some classes of full amicable orthogonal designs, and we obtain an infinite class of full amicable orthogonal designs. Moreover, a full amicable orthogonal design of order 292^9 and type (2(8)6;2(8)6)\big(2^6_{(8)}; 2^6_{(8)}\big) is constructed.

Keywords

Cite

@article{arxiv.1509.03627,
  title  = {Some Constructions for Amicable Orthogonal Designs},
  author = {Ebrahim Ghaderpour},
  journal= {arXiv preprint arXiv:1509.03627},
  year   = {2015}
}

Comments

12 pages, To appear in the Australasian Journal of Combinatorics

R2 v1 2026-06-22T10:54:52.436Z