Covering the plane by rotations of a lattice arrangement of disks
Abstract
Suppose we put an ε-disk around each lattice point in the plane, and then we rotate this object around the origin for a set of angles. When do we cover the whole plane, except for a neighborhood of the origin? This is the problem we study in this paper. It is very easy to see that if = [0,2π] then we do indeed cover. The problem becomes more interesting if we try to achieve covering with a small closed set .
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