Separators for intersection graphs of spheres
Abstract
We prove the existence of optimal separators for intersection graphs of balls and spheres in any dimension d. One of our results is that if an intersection graph of n spheres in Rd has m edges, then it contains a balanced separator of size Od(m1/dn1-2/d). This bound is best possible in terms of the parameters involved. The same result holds if the balls and spheres are replaced by fat convex bodies and their boundaries.
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