Worst-Case Optimal Covering of Rectangles by Disks

Abstract

We provide the solution for a fundamental problem of geometric optimization by giving a complete characterization of worst-case optimal disk coverings of rectangles: For any λ≥ 1, the critical covering area A*(λ) is the minimum value for which any set of disks with total area at least A*(λ) can cover a rectangle of dimensions λ× 1. We show that there is a threshold value λ2 = 7/2 - 1/4 ≈ 1.035797…, such that for λ<λ2 the critical covering area A*(λ) is A*(λ)=3π(λ216 +532 + 9256λ2), and for λ≥ λ2, the critical area is A*(λ)=π(λ2+2)/4; these values are tight. For the special case λ=1, i.e., for covering a unit square, the critical covering area is 195π256≈ 2.39301…. The proof uses a careful combination of manual and automatic analysis, demonstrating the power of the employed interval arithmetic technique.