The prime grid contains arbitrarily large empty polygons
Abstract
This paper proves a 2017 conjecture of De Loera, La Haye, Oliveros, and Rold\'an-Pensado that the "prime grid" \(p,q) ∈ Z2 : p and q are prime\ ⊂eq R2 contains empty polygons with arbitrarily many vertices. This implies that no Helly-type theorem is true for the prime grid.
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