The limit of Lp Voronoi diagrams as p → 0 is the bounding-box-area Voronoi diagram
Abstract
We consider the Voronoi diagram of points in the real plane when the distance between two points a and b is given by Lp(a-b) where Lp((x,y)) = (|x|p+|y|p)1/p. We prove that the Voronoi diagram has a limit as p converges to zero from above or from below: it is the diagram that corresponds to the distance function L*((x,y)) = |xy|. In this diagram, the bisector of two points in general position consists of a line and two branches of a hyperbola that split the plane into three faces per point. We propose to name L* as defined above the "geometric L0 distance".
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