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Title: GDDs with two associate classes and with three groups of sizes 1, n and n
Authors: Lapchinda, W. 
Punnim, N. 
Pabhapote, P. 
Issue Date: 2014
Publisher: Scopus
University of the Thai Chamber of Commerce
Source: W. Lapchinda, N. Punnim, P. Pabhapote (2014) GDDs with two associate classes and with three groups of sizes 1, n and n. Australasian Journal of Combinatorics Vol.58 No.2, 292-303.
Abstract: A group divisible design GDD(v = 1+n+ n, 3, λ1, λ2) is an ordered pair (V, B) where V is an (1 + n + n)set of symbols and B is a collection of 3subsets (called blocks) of V satisfying the following properties: the (1 + n + n)set is divided into 3 groups of sizes 1, n and n; each pair of symbols from the same group occurs in exactly λ1 blocks in B; and each pair of symbols from differentgroups occurs in exactly λ2 blocks in B. The spectrum of λ1, λ2, denoted by Spec(λ1, λ2), is defined by Spec(λ1, λ2) = {n ∈ N: a GDD(v = 1+n + n, 3, λ1, λ2) exists}. We find the spectrum Spec(λ1, λ2) for all λ1 ≥ λ2.
Rights: This work is protected by copyright. Reproduction or distribution of the work in any format is prohibited without written permission of the copyright owner.
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