Drawing the double circle on a grid of minimum size
Abstract
In 1926, Jarn\'ik introduced the problem of drawing a convex n-gon with vertices having integer coordinates. He constructed such a drawing in the grid [1,c· n3/2]2 for some constant c>0, and showed that this grid size is optimal up to a constant factor. We consider the analogous problem for drawing the double circle, and prove that it can be done within the same grid size. Moreover, we give an O(n)-time algorithm to construct such a point set.
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