Maximal resolvability of bounded groups

Let G be a transitive permutation group on a set ⍀ such that G is not a 2-group and let m be a positive integer. It was shown by the fourth author that if < g < < < ? Ž . @ ⌫ \_ ⌫ F m for every subset ⌫ of ⍀ and all g g G, then ⍀ F 2 mpr p y 1 , < < < < where p is the least odd prime dividing G . If

Let G be a permutation group on a set Ω such that G has no fixed points in Ω. If, for a given positive integer m, the cardinalities |Γ g \Γ | is at most m for all g ∈ G and Γ ⊆ Ω, then G is said to have bounded movement m on Ω. When the maximum of |Γ g \Γ | over all g ∈ G and Γ ⊆ Ω is equal to m, we

Apart from hyperovals and their duals there are only three classes of maximal arcs known in Desarguesian projective planes. Two classes are due to J. A. Thas and one to R. H. F. Denniston. In this paper collineation stabiliser and isomorphism problems for those maximal arcs in Desarguesian projectiv