Abstract
Abstract We present an upper bound on the number of vertices in graphs of given degree and diameter 3 that arise as lifts of dipoles with voltage assignments in Abelian groups. Further, we construct a family of Cayley graphs of degree d = 3 m − 1 and diameter k ⩾ 3 of order km k . By comparison with other available results in this area we show that, for sufficiently large d and k such that k ⩽ d − 2 , our family gives the current largest known Cayley graphs of degree d and diameter k.
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