= Erdős distinct distances problem
{wiki=Erdős_distinct_distances_problem}
The Erdős distinct distances problem, posed by the Hungarian mathematician Paul Erdős in 1946, is a question in combinatorial geometry that seeks to determine the minimum number of distinct distances between points in a given finite set in the plane. Specifically, the problem asks for the largest number of points \\( n \\) that can be placed in the plane such that the number of distinct distances between pairs of points is minimized.
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