Constant Amortized Time Enumeration of Independent Sets for Graphs with Bounded Clique Number
June 24, 2019 Β· Declared Dead Β· π Theoretical Computer Science
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Authors
Kazuhiro Kurita, Kunihiro Wasa, Hiroki Arimura, Takeaki Uno
arXiv ID
1906.09680
Category
cs.DS: Data Structures & Algorithms
Citations
3
Venue
Theoretical Computer Science
Last Checked
4 months ago
Abstract
In this study, we address the independent set enumeration problem. Although several efficient enumeration algorithms and careful analyses have been proposed for maximal independent sets, no fine-grained analysis has been given for the non-maximal variant. From the main result, we propose an algorithm $\texttt{EIS}$ for the non-maximal variant that runs in $O(q)$ amortized time and linear space, where $q$ is the clique number, i.e., the maximum size of a clique in an input graph. Note that $\texttt{EIS}$ works correctly even if the exact value of $q$ is unknown. Despite its simplicity, $\texttt{EIS}$ is optimal for graphs with a bounded clique number, such as, triangle-free graphs, planar graphs, bounded degenerate graphs, locally bounded expansion graphs, and $F$-free graphs for any fixed graph $F$, where a $F$-free graph is a graph that has no copy of $F$ as a subgraph.
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