Generalized Bhaskar Rao Designs with Block Size 3 over Finite Abelian Groups

Gennian Ge; Malcolm Greig; Jennifer Seberry; Ralph Seberry

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Generalized Bhaskar Rao Designs with Block Size 3 over Finite Abelian Groups

机译：有限Abelian群上块大小为3的广义Bhaskar Rao设计

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We show that if G is a finite Abelian group and the block size is 3, then the necessary conditions for the existence of a (v,3,λ;G) GBRD are sufficient. These necessary conditions include the usual necessary conditions for the existence of the associated (v,3,λ) BIBD plus λ≡ 0 (mod|G|), plus some extra conditions when |G| is even, namely that the number of blocks be divisible by 4 and, if v = 3 and the Sylow 2-subgroup of G is cyclic, then also λ≡ 0 (mod2|G|).

机译：我们证明，如果G是一个有限的Abelian组并且块大小为3，则存在（v，3，λ; G）GBRD的必要条件就足够了。这些必要条件包括存在相关的（v，3，λ）BIBD的通常必要条件，加上λ≡0（mod | G |），以及| G |时的一些额外条件。偶数是偶数，即块数可被4整除，如果v = 3并且G的Sylow 2子群是循环的，则λmod0（mod2 | G |）。

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来源
《Graphs and Combinatorics》 |2007年第3期|271-290|共20页
作者
Gennian Ge; Malcolm Greig; Jennifer Seberry; Ralph Seberry;
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作者单位

Department of Mathematics Zhejiang University Hangzhou 310027 Zhejiang P. R. China;

Greig Consulting 317–130 Eleventh St. East North Vancouver B.C. V7L 4R3 Canada;

Centre for Computer Security Research SITACS University of Wollongong Wollongong NSW 2522 Australia;

7 Leeds Place Turramurra NSW 2074 Australia;

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原文格式 PDF
正文语种 eng
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关键词
Generalized Bhaskar Rao design; Cyclic group divisible designs;

机译：广义Bhaskar Rao设计;循环群可分设计;
入库时间 2022-08-18 01:49:06

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专利

1. Generalized Bhaskar Rao Designs with Block Size 4 Signed over Elementary Abelian Groups [J] . Gennian Ge, Malcolm Greig, Jennifer Seberry The Journal of Combinatorial Mathematics and Combinatorial Computing . 2003,第Aug期

机译：块大小为4的广义Bhaskar Rao设计在基本Abelian组上签名
2. Existence of generalized Bhaskar Rao designs with block size 3 [J] . Abel R. Julian R., Combe Diana, Price Georgina, Discrete mathematics . 2009,第12期

机译：块大小为3的广义Bhaskar Rao设计的存在
3. Bhaskar Rao designs with block size four [J] . G. Ge, C. W. H. Lam Discrete mathematics . 2003,第1a3期

机译：Bhaskar Rao设计了4号块
4. Generalized Conjugacy Class Graph of Some Finite Non- Abelian Groups [C] . S. M. S. Omer, N. H. Sarmin, A. Erfanian International Conference on Mathematics, Engineering and Industrial Applications . 2015

机译：一些有限的非阿比越群的广义共轭阶级图
5. Synthesis and fabrication of sized-controlled nanoparticles: Using surface self-assemblies as building blocks for developing supralattices on nanocomposite materials. [D] . Yee, Chanel Kitmon. 2001

机译：尺寸受控的纳米粒子的合成和制造：使用表面自组装作为构建纳米复合材料上超分子的构建基块。
6. Generalized stern models of the electric double layer considering the spatial variation of permittvity and finite size of ions in saturation regime [O] . Ekaterina Gongadze, Ursula Van Rienen, Aleš Iglič 2011

机译：考虑介电常数的空间变化和饱和态离子的有限尺寸的双层广义船尾模型。
7. Generalized Bhaskar Rao Designs with Block Size 3 over Finite Abelian Groups [O] . Gennian Ge, Malcolm Greig, Jennifer Seberry, 2011

机译：有限Abelian群上块大小为3的广义Bhaskar Rao设计
8. BIB Designs with Variable Support Sizes When Blocks are of Size Three. [R] . Hedayat, A. 1977

机译：当块大小为3时，BIB设计具有可变支持大小。

Generalized Bhaskar Rao Designs with Block Size 3 over Finite Abelian Groups

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