An improved lower bound to Erdos' problem concerning products of distances for fixed diameter

Abstract

Erdos, Herzog and Piranian asked whether, for n points in the plane with fixed diameter (maximum distance between points), an arrangement of a regular n-gon maximizes their product of all pairs of distances. Recently, it was discovered that, for every even n ≥ 4, a regular n-gon is not a maximizer. However, the discovered improvement turns out to be very small. Indeed, for a fixed diameter of 2, let be the square of the product of all pairs of distances (the "square" is here due to connections with polynomial discriminants). Then, for a regular n-gon, = nn for even n. The discovered arrangements have proven = (1+o(1))nn thus far, and it was not known whether one can have ≥ C nn for some C > 1 and all sufficiently large even n. In this note, we show that indeed n∞ /nn > 1.037 for even n which settles this conjecture. Other arrangements with higher conjectured /nn values are in fact known, but we have not been able to obtain proofs that they have large products of distances. Finally, no arrangements such that /nn ∞ are known and we do not know whether they exist.

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