On the union complexity of families of axis-parallel rectangles with a low packing number
Abstract
Let R be a family of n axis-parallel rectangles with packing number p-1, meaning that among any p of the rectangles, there are two with a non-empty intersection. We show that the union complexity of R is at most O(n+p2), and that the (<=k)-level complexity of R is at most O(kn+k2p2). Both upper bounds are tight.
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