Two trees are better than one
Abstract
We consider partitions of a point set into two parts, and the lengths of the minimum spanning trees of the original set and of the two parts. If w(P) denotes the length of a minimum spanning tree of P, we show that every set P of n ≥ 12 points admits a bipartition P= R B for which the ratio w(R)+w(B)w(P) is strictly larger than 1; and that 1 is the largest number with this property. Furthermore, we provide a very fast algorithm that computes such a bipartition in O(1) time and one that computes the corresponding ratio in O(n n) time. In certain settings, a ratio larger than 1 can be expected and sometimes guaranteed. For example, if P is a set of n random points uniformly distributed in [0,1]2 (n ∞), then for any >0, the above ratio in a maximizing partition is at least 2 - with probability tending to 1. As another example, if P is a set of n points with spread at most α n, for some constant α>0, then the aforementioned ratio in a maximizing partition is 1 + (α-2). All our results and techniques are extendable to higher dimensions.
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