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Abstract
Geometrical objects with integral side lengths have fascinated mathematicians through the ages. We call a set P={p 1, …, p n }⊂ℤ2 a maximal integral point set over ℤ2 if all pairwise distances are integral and every additional point p n+1 destroys this property. Here we consider such sets for a given cardinality and with minimum possible diameter. We determine some exact values via exhaustive search and give several constructions for arbitrary cardinalities. Since we cannot guarantee the maximality in these cases, we describe an algorithm to prove or disprove the maximality of a given integral point set. We additionally consider restrictions as no three points on a line and no four points on a circle.
Acknowledgements
We would like to thank the anonymous referees for many helpful comments to improve the presentation of the article.