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arxiv: 2412.02828 · v1 · pith:ZEF3OVTV · submitted 2024-12-03 · cs.DS

Computing the Center of Uncertain Points on Cactus Graphs

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classification cs.DS
keywords uncertainpointsalgorithmcactusproblemweightedcentergraph
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In this paper, we consider the (weighted) one-center problem of uncertain points on a cactus graph. Given are a cactus graph $G$ and a set of $n$ uncertain points. Each uncertain point has $m$ possible locations on $G$ with probabilities and a non-negative weight. The (weighted) one-center problem aims to compute a point (the center) $x^*$ on $G$ to minimize the maximum (weighted) expected distance from $x^*$ to all uncertain points. No previous algorithm is known for this problem. In this paper, we propose an $O(|G| + mn\log mn)$-time algorithm for solving it. Since the input is $O(|G|+mn)$, our algorithm is almost optimal.

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