Notes on computing peaks in k-levels and parametric spanning trees
Abstract
We give an algorithm to compute all the local peaks in the k-level of an arrangement of n lines in O(n n) + O((kn)2/3) time. We can also find τ largest peaks in O(n 2 n) + O((τ n)2/3) time. Moreover, we consider the longest edge in a parametric minimum spanning tree (in other words, a bottleneck edge for connectivity), and give an algorithm to compute the parameter value (within a given interval) maximizing/minimizing the length of the longest edge in MST. The time complexity is O(n8/7k1/7 + n k1/3)
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