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Solving a long standing conjecture of Erdos and Simonovits, Brandt and Thomass\'e proved that the chromatic number of each triangle-free graph G such that (G) >|V (G) |/3 is at most four. In fact, they showed the much stronger result that every maximal triangle-free graph G satisfying this minimum degree condition is a blow-up of either an Andr\'asfai or a Vega graph. Here we establish the same structural conclusion on G under the weaker assumption that for m\2, 3, 4\ every sequence of 3m vertices has a subsequence of length m+1 with a common neighbour. In forthcoming work this will be used to solve an old problem of Andr\'asfai in Ramsey-Tur\'an theory.
Łuczak et al. (Sat,) studied this question.
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