Settling the no-(k+1)-in-line problem when k is not small
Abstract
What is the maximum number of points that can be selected from an n × n square lattice such that no k+1 of them are in a line? This has been asked more than 100 years ago for k=2 and it remained wide open ever since. In this paper, we prove the precise answer is kn, provided that k>Cnn for an absolute constant C. The proof relies on carefully constructed bi-uniform random bipartite graphs and concentration inequalities.
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