Team:ROMA

Inria | Raweb 2013 | Presentation of the Team ROMA


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Section: New Results

On the minimum edge cover and vertex partition by quasi-cliques problems

A $γ$ -quasi-clique in a simple undirected graph is a set of vertices which induces a subgraph with the edge density of at least $γ$ for $0 < γ < 1$ . A cover of a graph by $γ$ -quasi-cliques is a set of $γ$ -quasi-cliques where each edge of the graph is contained in at least one quasi-clique. The minimum cover by $γ$ -quasi-cliques problem asks for a $γ$ -quasi-clique cover with the minimum number of quasi-cliques. A partition of a graph by $γ$ -quasi-cliques is a set of $γ$ -quasi-cliques where each vertex of the graph belongs to exactly one quasi-clique. The minimum partition by $γ$ -quasi-cliques problem asks for a vertex partition by $γ$ -quasi-cliques with the minimum number of quasi-cliques. In this work [60] , we show that the decision versions of the minimum cover and partition by $γ$ -quasi-cliques problems are NP-complete for any fixed $γ$ satisfying $0 < γ < 1$ .

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