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Title
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Elementary abelian covers of the Wreath graph W(3,2) and the Foster graph F26A
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Type
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JournalPaper
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Keywords
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Invariant subspace; A-T graphs; Wreath graph Wð3; 2Þ; Foster graph F26A; (A-T) C-P; (E-T) C-P
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Abstract
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Arc-transitive and edge-transitive graphs are widely used in computer networks. Therefore, it is very useful to introduce and study the properties of these graphs. A graph ! can be called G-edge-transitive (G-E-T) or G-arc-transitive (G-A-T) if G acts transitively on its edges or arc set, where G6Autð!Þ, respectively. A regular covering projection (C-P) p : ! ! ! is E-T or A-T if an E-R or A-T subgroup of Autð!Þ lifts under p: In this paper, we first study all p-elementary abelian (E-A) regular covers of Wreath graph Wð2, 3Þ and then investigate (E-T) regular Zp-covers of the Foster graph F26A
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Researchers
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Hosain Rashmanlou (Not In First Six Researchers), ali Asghar Talebi (Fifth Researcher), narges mehdipoor (Fourth Researcher), Shahabaldin Omidian (Third Researcher), Saeed Kosari (Second Researcher), Zhuo Jab Chen (First Researcher)
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