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On the use of regular arrays in the construction of t-designs

Published online by Cambridge University Press:  05 August 2013

L. Teirlinck
Affiliation:
Auburn University
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Summary

INTRODUCTION

A t–design S(λ; t, k, v) is a collection of k–subsets, called blocks, of a v-set S such that any t-subset of S is contained in exactly λ blocks. An S(λ; 2, k, v) is often called a (v, k, λ)-design and an S(λ; t, k, v) is often called a t-(v, k, λ)- design. An S(λ; t, k, v) is called simple if it contains no repeated blocks* It has been known for a long time that there are a lot of S(λ; t, k, v) for all t, see [6, 23]. However, until relatively recently, the only known examples of simple t-designs with t ≥ 6 were the trivial t-designs consisting of all k-subsets of a v-set. The first examples of non-trivial simple 6-designs were found by Magliveras and Leavitt [9]. In [19], we constructed nontrivlal simple t-designs for all t. It is not the purpose of this paper to give another proof of the main result of [19], as a simplified proof Is already given in [21]. Rather, we will survey construction techniques for t-designs using totally symmetric regular arrays, or, equlvalently, regular extended designs. These techniques played a major role in the construction of non-trivial simple t-designs for arbitrary t. We will point out the relationship between the techniques of [19, 21] and results of Wilson, Schreiber, Beth and Lu, as well as other results of the author and folklore direct product constructions.

Type
Chapter
Information
Surveys in Combinatorics, 1989
Invited Papers at the Twelfth British Combinatorial Conference
, pp. 189 - 207
Publisher: Cambridge University Press
Print publication year: 1989

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