Gabriel Currier, Jozsef Solymosi, Hung-Hsun Hans Yu
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On the structure of extremal point-line arrangements
In this note, we show that extremal Szemer\'{e}di-Trotter configurations are
rigid in the following sense: If $P,L$ are sets of points and lines determining
at least $C|P|^{2/3}|L|^{2/3}$ incidences, then there exists a collection $P'$
of points of size at most $k = k_0(C)$ such that, heuristically, fixing those
points fixes a positive fraction of the arrangement. That is, the incidence
structure and a small number of points determine a large part of the
arrangement. The key tools we use are the Guth-Katz polynomial partitioning,
and also a result of Dvir, Garg, Oliveira and Solymosi that was used to show
the rigidity of near-Sylvester-Gallai configurations.
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