Improved Approximations for Ultrametric Violation Distance

Abstract

We study the Ultrametric Violation Distance problem introduced by Cohen-Addad, Fan, Lee, and Mesmay [FOCS, 2022]. Given pairwise distances x∈ R>0[n]2 as input, the goal is to modify the minimum number of distances so as to make it a valid ultrametric. In other words, this is the problem of fitting an ultrametric to given data, where the quality of the fit is measured by the 0 norm of the error; variants of the problem for the ∞ and 1 norms are well-studied in the literature. Our main result is a 5-approximation algorithm for Ultrametric Violation Distance, improving the previous best large constant factor (≥ 1000) approximation algorithm. We give an O(\L, n\)-approximation for weighted Ultrametric Violation Distance where the weights satisfy triangle inequality and L is the number of distinct values in the input. We also give a 16-approximation for the problem on k-partite graphs, where the input is specified on pairs of vertices that form a complete k-partite graph. All our results use a unified algorithmic framework with small modifications for the three cases.

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