On the Relationship Between Clique-Width and Treewidth
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[1] Bruno Courcelle,et al. Upper bounds to the clique width of graphs , 2000, Discret. Appl. Math..
[2] Egon Wanke,et al. Deciding Clique-Width for Graphs of Bounded Tree-Width , 2001, J. Graph Algorithms Appl..
[3] Bruno Courcelle,et al. On the fixed parameter complexity of graph enumeration problems definable in monadic second-order logic , 2001, Discret. Appl. Math..
[4] Hans L. Bodlaender,et al. A linear time algorithm for finding tree-decompositions of small treewidth , 1993, STOC.
[5] B. Reed,et al. Polynomial Time Recognition of Clique-Width ≤ 3 Graphs , 2000 .
[6] Udi Rotics,et al. On the Clique-Width of Some Perfect Graph Classes , 2000, Int. J. Found. Comput. Sci..
[7] Lorna Stewart,et al. A Linear Recognition Algorithm for Cographs , 1985, SIAM J. Comput..
[8] Bruno Courcelle,et al. Handle-Rewriting Hypergraph Grammars , 1993, J. Comput. Syst. Sci..
[9] Vadim V. Lozin,et al. On the linear structure and clique-width of bipartite permutation graphs , 2003, Ars Comb..
[10] Udi Rotics,et al. Polynomial algorithms for partitioning problems on graphs with fixed clique-width (extended abstract) , 2001, SODA '01.
[11] Michael U. Gerber,et al. Algorithms for vertex-partitioning problems on graphs with fixed clique-width , 2003, Theor. Comput. Sci..
[12] Udi Rotics,et al. Edge dominating set and colorings on graphs with fixed clique-width , 2003, Discret. Appl. Math..
[13] Egon Wanke,et al. k-NLC Graphs and Polynomial Algorithms , 1994, Discret. Appl. Math..
[14] Bruno Courcelle,et al. Linear Time Solvable Optimization Problems on Graphs of Bounded Clique-Width , 2000, Theory of Computing Systems.
[15] Derek G. Corneil,et al. Complexity of finding embeddings in a k -tree , 1987 .