At most 10 cylinders mutually touch: a Ramsey-theoretic approach

Abstract

Littlewood asked for the maximum number N of congruent infinite cylinders that can be arranged in R3 so that every pair touches. We improve upon the proof of the second author that N ≤ 18 to show that N ≤ 10. Together with the lower bound established by Boz\'oki, Lee, and R\'onyai, this shows that N ∈ \7,8,9,10\. Our method is based on linear algebra and Ramsey theory, and makes partial use of computer verification. We also provide a completely computer-free proof that N ≤ 12.

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