A classification of Q-polynomial distance-regular graphs with girth 6
Abstract
Let denote a Q-polynomial distance-regular graph with diameter D and valency k 3. In [Homotopy in Q-polynomial distance-regular graphs, Discrete Math., 223 (2000), 189-206], H. Lewis showed that the girth of is at most 6. In this paper we classify graphs that attain this upper bound. We show that has girth 6 if and only if it is either isomorphic to the Odd graph on a set of cardinality 2D +1, or to a generalized hexagon of order (1, k -1).
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