In this paper, we design a framework to obtain efficient algorithms for several problems with a global constraint (acyclicity or connectivity) such as Connected Dominating Set, Node Weighted Steiner Tree, Maximum Induced Tree, Longest Induced Path, and Feedback Vertex Set. We design a meta-algorithm that solves all these problems and whose running time is upper bounded by $2^{O(k)}\cdot n^{O(1)}$, $2^{O(k \log(k))}\cdot n^{O(1)}$, $2^{O(k^2)}\cdot n^{O(1)}$, and $n^{O(k)}$ where $k$ is respectively the clique-width, $\mathbb{Q}$-rank-width, rank-width, and maximum induced matching width of a given decomposition. Our approach simplifies and unifies the known algorithms for each of the parameters and its running time matches asymptotically al...
We handle in this paper three dominating clique problems, namely, the decision problem to detect whe...
We prove that the rank-width of an n-vertex graph can be com-puted exactly in time O(2nn3 log2 n log...
Rank-width was defined by Oum and Seymour [2006. Approximating clique-width and branch-width. J. Com...
In this paper, we design a framework to obtain efficient algorithms for several problems with a glob...
In this paper, we design a framework to obtain efficient algorithms for several problems with a glob...
In this paper, we design a framework to obtain efficient algorithms for several problems with a glob...
In this paper, we design a framework to obtain efficient algorithms for several problems with a glob...
Given a clique-width $k$-expression of a graph $G$, we provide $2^{O(k)}\cdot n$ time algorithms for...
In the last decades, considerable efforts have been spent to characterize what makes NP-hard problem...
We introduce a logic called distance neighborhood logic with acyclicity and connectivity constraints...
33 pages, 6 figuresInternational audienceWe recently introduced the graph invariant twin-width, and ...
Abstract. Rank-width is defined by Seymour and the author to inves-tigate clique-width; they show th...
The NP-complete Power Dominating Set problem is an “electric power networks variant ” of the classic...
The dominating set problem in graphs asks for a minimumsize subset of vertices with the following pr...
In this paper, we consider tree decompositions, branch decompositions, and clique decompositions. We...
We handle in this paper three dominating clique problems, namely, the decision problem to detect whe...
We prove that the rank-width of an n-vertex graph can be com-puted exactly in time O(2nn3 log2 n log...
Rank-width was defined by Oum and Seymour [2006. Approximating clique-width and branch-width. J. Com...
In this paper, we design a framework to obtain efficient algorithms for several problems with a glob...
In this paper, we design a framework to obtain efficient algorithms for several problems with a glob...
In this paper, we design a framework to obtain efficient algorithms for several problems with a glob...
In this paper, we design a framework to obtain efficient algorithms for several problems with a glob...
Given a clique-width $k$-expression of a graph $G$, we provide $2^{O(k)}\cdot n$ time algorithms for...
In the last decades, considerable efforts have been spent to characterize what makes NP-hard problem...
We introduce a logic called distance neighborhood logic with acyclicity and connectivity constraints...
33 pages, 6 figuresInternational audienceWe recently introduced the graph invariant twin-width, and ...
Abstract. Rank-width is defined by Seymour and the author to inves-tigate clique-width; they show th...
The NP-complete Power Dominating Set problem is an “electric power networks variant ” of the classic...
The dominating set problem in graphs asks for a minimumsize subset of vertices with the following pr...
In this paper, we consider tree decompositions, branch decompositions, and clique decompositions. We...
We handle in this paper three dominating clique problems, namely, the decision problem to detect whe...
We prove that the rank-width of an n-vertex graph can be com-puted exactly in time O(2nn3 log2 n log...
Rank-width was defined by Oum and Seymour [2006. Approximating clique-width and branch-width. J. Com...