Large Networks of Diameter Two Based on Cayley Graphs
Abstract
In this contribution we present a construction of large networks of diameter two and of order 12d2 for every degree d≥ 8, based on Cayley graphs with surprisingly simple underlying groups. For several small degrees we construct Cayley graphs of diameter two and of order greater than 23 of Moore bound and we show that Cayley graphs of degrees d∈\16,17,18,23,24,31,…,35\ constructed in this paper are the largest currently known vertex-transitive graphs of diameter two.
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