Title of article
k-CS-transitive infinite graphs
Author/Authors
Gray، نويسنده , , Robert، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2009
Pages
21
From page
378
To page
398
Abstract
A graph Γ is k-CS-transitive, for a positive integer k, if for any two connected isomorphic induced subgraphs A and B of Γ, each of size k, there is an automorphism of Γ taking A to B. The graph is called k-CS-homogeneous if any isomorphism between two connected induced subgraphs of size k extends to an automorphism. We consider locally-finite infinite k-CS-homogeneous and k-CS-transitive graphs. We classify those that are 3-CS-transitive (respectively homogeneous) and have more than one end. In particular, the 3-CS-homogeneous graphs with more than one end are precisely Macphersonʹs locally finite distance transitive graphs. The 3-CS-transitive but non-homogeneous graphs come in two classes. The first are line graphs of semiregular trees with valencies 2 and m, while the second is a class of graphs built up from copies of the complete graph K 4 , which we describe.
Keywords
Automorphism group , graph , Symmetry , Distance-transitive graphs , ends of graphs , Homogeneous structures , Arc-transitive graphs
Journal title
Journal of Combinatorial Theory Series B
Serial Year
2009
Journal title
Journal of Combinatorial Theory Series B
Record number
1528832
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