Paths on the Doubly Covered Region of a Covering of the Plane by Unit Discs

Abstract

Given a covering of the plane by closed unit discs F and two points A and B in the region doubly covered by F, what is the length of the shortest path connecting them that stays within the doubly covered region? This is a problem of G. Fejes-T\'oth and he conjectured that if the distance between A and B is d, then the length of this path is at most 2 d+O(1). In this paper we give a bound of 2.78 d+O(1).