Listing 6-Cycles
Listing copies of small subgraphs (such as triangles, $4$-cycles, small cliques) in the input graph is an important and well-studied problem in algorithmic graph theory. In this paper, we give a simple algorithm that lists $t$ (non-induced) $6$-cycles in an $n$-node undirected graph in $\tilde O(n^2...
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| Zusammenfassung: | Listing copies of small subgraphs (such as triangles, $4$-cycles, small
cliques) in the input graph is an important and well-studied problem in
algorithmic graph theory. In this paper, we give a simple algorithm that lists
$t$ (non-induced) $6$-cycles in an $n$-node undirected graph in $\tilde
O(n^2+t)$ time. This nearly matches the fastest known algorithm for detecting a
$6$-cycle in $O(n^2)$ time by Yuster and Zwick (1997). Previously, a folklore
$O(n^2+t)$-time algorithm was known for the task of listing $4$-cycles. |
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| DOI: | 10.48550/arxiv.2310.14575 |