2-Walk-Regular Dihedrants from Group-Divisible Designs

Zhi Qiao; Shao Fei Du; Jack H Koolen

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2-Walk-Regular Dihedrants from Group-Divisible Designs

机译：群可除设计中的2步规则的二元对数

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In this note, we construct bipartite $2$-walk-regular graphs with exactly 6 distinct eigenvalues as the point-block incidence graphs of group divisible designs with the dual property. For many of them, we show that they are 2-arc-transitive dihedrants. We note that some of these graphs are not described in Du et al. (2008), in which they classified the connected 2-arc transitive dihedrants.?

机译：在本说明中，我们构造了具有正好6个不同特征值的二元$ 2 $ -walk-regular图，作为具有对偶性质的组可分设计的点块入射图。对于它们中的许多，我们表明它们是2弧传递性二面体。我们注意到，Du等人并未描述其中一些图。（2008年），他们在分类中将连接的2弧可及消光剂分类。

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《Electronic Journal Of Combinatorics》 |2016年第2期|共页
作者
Zhi Qiao; Shao Fei Du; Jack H Koolen;
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中图分类离散数学;
关键词
2-walk-regular graphsDistance-regular graphsAssociation schemesGroup divisible designs with the dual propertyRelative cyclic difference sets2-arc-transitive dihedrants;

机译：2行正则图距离正则图关联方案具有双重属性的组可分设计相对循环差集2弧形传递对分;

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2-Walk-Regular Dihedrants from Group-Divisible Designs

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