Shangqi Lu, W. Martens, Matthias Niewerth, Yufei Tao
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引用次数: 0
摘要
偏序多路搜索(POMS)是众包、分布式文件系统、软件测试等领域的一个重要问题。在这个问题中,基于双方已知的有向无环图G,在算法a和oracle之间进行博弈。首先,oracle在G中选择一个顶点t,称为目标;那么,A的目的是通过探测可达性来找出哪个顶点是t。在每个探测中,A在G中选择一个集合Q的顶点,其大小以预先约定的值k为界,然后oracle显示,对于每个顶点Q 2q, Q是否可以到达G中的目标。A的目标是最小化探测的数量。本文提出了一种用O(log1+k n +k log1+d n)个探针求解POMS的算法,其中n为G中顶点的个数,d为G中顶点的最大出度,探测复杂度是渐近最优的。
An Optimal Algorithm for Partial Order Multiway Search
Partial order multiway search (POMS) is an important problem that finds use in crowdsourcing, distributed file systems, software testing, etc. In this problem, a game is played between an algorithm A and an oracle, based on a directed acyclic graph G known to both parties. First, the oracle picks a vertex t in G called the target; then, A aims to figure out which vertex is t by probing reachability. In each probe, A selects a set Q of vertices in G whose size is bounded by a pre-agreed value k, and the oracle then reveals, for each vertex q 2 Q, whether q can reach the target in G. The objective of A is to minimize the number of probes. This article presents an algorithm to solve POMS in O(log1+k n + d k log1+d n) probes, where n is the number of vertices in G, and d is the largest out-degree of the vertices in G. The probing complexity is asymptotically optimal.
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