Two vertices $u, v \in V$ of an undirected connected graph $G=(V,E)$ are resolved by a vertex $w$ if the distance between $u$ and $w$ and the distance between $v$ and $w$ are different. A set $R \subseteq V$ of vertices is a $k$-resolving set for $G$ if for each pair of vertices $u, v \in V$ there are at least $k$ distinct vertices $w_1,\ldots,w_k \in R$ such that each of them resolves $u$ and $v$. The $k$-Metric Dimension of $G$ is the size of a smallest $k$-resolving set for $G$. The decision problem $k$-Metric Dimension is the question whether G has a $k$-resolving set of size at most $r$, for a given graph $G$ and a given number $r$. In this paper, we proof the NP-completeness of $k$-Metric Dimension for bipartite graphs and each $k \geq 2$.
翻译:如果美元与美元之间的距离和美元与美元之间的距离不同,则用一个顶点以美元(V,E)解决未方向连接的图形$G=(V,E)美元中的2美元或美元(V)美元。如果每对顶点的1美元或美元(V美元)中至少有1美元(K)美元(V)美元(V)美元(V)美元(V)美元/美元(V)美元/美元(W)美元/美元(W)美元/美元(W美元)/美元(W)/美元/美元(W)/美元/美元(W)/美元)/美元(W)/美元(W)/美元/美元(W)/美元(W)/美元(W)/美元(W)/美元(W)/美元(W)/美元(W)/美元(W)/美元(V)/美元(V)/美元(V)/美元(V)/美元(V美元/美元/美元(G)/美元/美元/美元(G)/美元(美元(美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元/美元
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