How many times can two minimum spanning trees cross?
Abstract
Let P be a generic set of n points in the plane, and let P=R B be a coloring of P in two colors. We are interested in the number of crossings between the minimum spanning trees (MSTs) of R and B, denoted by (R,B). We define the bicolored MST crossing number of P, denoted by (P), as (P) = P= R B((R,B)). We prove a linear upper bound for (P) when P is generic. If P is dense or in convex position, we provide linear lower bounds. Lastly, if P is chosen uniformly at random from the unit square and is colored uniformly at random, we prove that the expected value of (R,B) is linear.
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