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- Clique-sum abstract "In graph theory, a branch of mathematics, a clique-sum is a way of combining two graphs by gluing them together at a clique, analogous to the connected sum operation in topology. If two graphs G and H each contain cliques of equal size, the clique-sum of G and H is formed from their disjoint union by identifying pairs of vertices in these two cliques to form a single shared clique, and then possibly deleting some of the clique edges. A k-clique-sum is a clique-sum in which both cliques have at most k vertices. One may also form clique-sums and k-clique-sums of more than two graphs, by repeated application of the two-graph clique-sum operation.".
- Clique-sum thumbnail Clique-sum.svg?width=300.
- Clique-sum wikiPageExternalLink graphminoralgorithm.pdf.
- Clique-sum wikiPageID "17598460".
- Clique-sum wikiPageLength "9450".
- Clique-sum wikiPageOutDegree "39".
- Clique-sum wikiPageRevisionID "678819422".
- Clique-sum wikiPageWikiLink Approximation_algorithm.
- Clique-sum wikiPageWikiLink Category:Graph_minor_theory.
- Clique-sum wikiPageWikiLink Category:Graph_operations.
- Clique-sum wikiPageWikiLink Chordal_graph.
- Clique-sum wikiPageWikiLink Clique_(graph_theory).
- Clique-sum wikiPageWikiLink Connected_sum.
- Clique-sum wikiPageWikiLink Connectivity_(graph_theory).
- Clique-sum wikiPageWikiLink Discrete_Mathematics_(journal).
- Clique-sum wikiPageWikiLink Disjoint_union_of_graphs.
- Clique-sum wikiPageWikiLink Four_color_theorem.
- Clique-sum wikiPageWikiLink Genus_(mathematics).
- Clique-sum wikiPageWikiLink Glossary_of_graph_theory.
- Clique-sum wikiPageWikiLink Graph_connectivity.
- Clique-sum wikiPageWikiLink Graph_minor.
- Clique-sum wikiPageWikiLink Graph_operations.
- Clique-sum wikiPageWikiLink Graph_theory.
- Clique-sum wikiPageWikiLink Graphic_matroid.
- Clique-sum wikiPageWikiLink Hadwiger_conjecture_(graph_theory).
- Clique-sum wikiPageWikiLink Induced_subgraph.
- Clique-sum wikiPageWikiLink K-vertex-connected_graph.
- Clique-sum wikiPageWikiLink Matrix_(mathematics).
- Clique-sum wikiPageWikiLink Matroid.
- Clique-sum wikiPageWikiLink Maximal_planar_graph.
- Clique-sum wikiPageWikiLink Minor_(graph_theory).
- Clique-sum wikiPageWikiLink NP-complete.
- Clique-sum wikiPageWikiLink NP-completeness.
- Clique-sum wikiPageWikiLink Pathwidth.
- Clique-sum wikiPageWikiLink Planar_graph.
- Clique-sum wikiPageWikiLink Planar_graphs.
- Clique-sum wikiPageWikiLink Positive-definite_matrix.
- Clique-sum wikiPageWikiLink Positive_definite_matrix.
- Clique-sum wikiPageWikiLink Regular_matroid.
- Clique-sum wikiPageWikiLink SPQR_tree.
- Clique-sum wikiPageWikiLink Series-parallel_graph.
- Clique-sum wikiPageWikiLink Strangulated_graph.
- Clique-sum wikiPageWikiLink Topology.
- Clique-sum wikiPageWikiLink Totally_unimodular_matrix.
- Clique-sum wikiPageWikiLink Tree_(graph_theory).
- Clique-sum wikiPageWikiLink Treewidth.
- Clique-sum wikiPageWikiLink Triconnected_component.
- Clique-sum wikiPageWikiLink Unimodular_matrix.
- Clique-sum wikiPageWikiLink Wagner_graph.
- Clique-sum wikiPageWikiLink File:Clique-sum.svg.
- Clique-sum wikiPageWikiLink File:Strangulated_graph.svg.
- Clique-sum wikiPageWikiLinkText "1-clique-sum".
- Clique-sum wikiPageWikiLinkText "2-clique-sum".
- Clique-sum wikiPageWikiLinkText "Clique-sum".
- Clique-sum wikiPageWikiLinkText "clique separator".
- Clique-sum wikiPageWikiLinkText "clique-sum".
- Clique-sum wikiPageWikiLinkText "clique-sum#Generalizations".
- Clique-sum hasPhotoCollection Clique-sum.
- Clique-sum wikiPageUsesTemplate Template:Citation.
- Clique-sum wikiPageUsesTemplate Template:Harvtxt.
- Clique-sum wikiPageUsesTemplate Template:Reflist.
- Clique-sum subject Category:Graph_minor_theory.
- Clique-sum subject Category:Graph_operations.
- Clique-sum hypernym Way.
- Clique-sum type Article.
- Clique-sum type Article.
- Clique-sum comment "In graph theory, a branch of mathematics, a clique-sum is a way of combining two graphs by gluing them together at a clique, analogous to the connected sum operation in topology. If two graphs G and H each contain cliques of equal size, the clique-sum of G and H is formed from their disjoint union by identifying pairs of vertices in these two cliques to form a single shared clique, and then possibly deleting some of the clique edges.".
- Clique-sum label "Clique-sum".
- Clique-sum sameAs m.0464jh5.
- Clique-sum sameAs Сумма_по_клике.
- Clique-sum sameAs Q5134410.
- Clique-sum sameAs Q5134410.
- Clique-sum wasDerivedFrom Clique-sum?oldid=678819422.
- Clique-sum depiction Clique-sum.svg.
- Clique-sum isPrimaryTopicOf Clique-sum.