## Graph-Theoretic Concepts in Computer Science: 21st International Workshop, WG '95, Aachen, Germany, June 20 - 22, 1995. ProceedingsThis book constitutes the refereed proceedings of the 21st International Workshop on Graph-Theoretic Concepts in Computer Science, WG '95, held in Aachen, Germany, in June 1995. The WG workshop series contributes to integration in computer science by applying graph theoretical concepts in various areas as well as by taking up problems from practical applications and treating them theoretically. The book presents 30 carefully refereed revised papers selected from 52 submissions and reflects current activities in the field of computer science oriented graph theory, its computational aspects and its application. |

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### Contents

VCDimensions for Graphs | 1 |

Finding and Counting Small Induced Subgraphs Efficiently | 14 |

A Dynamic Algorithm for Line Graph Recognition | 37 |

Copyright | |

21 other sections not shown

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2-component acyclic adjacent arbitrary assume binary Boolean bound calling schedule cell cellwork L-system chordal graph class cardinality function clique tree closure space cographs complete Computer Science consider contains cutwidth cycle database scheme defined Definition degenerated module denote diametral path graphs digraph directed graph directed tree dummy edge edge costs embedding exists faults forward closure genus given graph G graph rewriting Hence hive graph hot-potato routing hyperarcs hyperedge hypergraph induced subgraph integer interval routing isomorphism L-system label Lemma Let G line graph linear maximal cliques maximum modular decomposition morphism multicast neighborhood neighbors NG(x node number of edges obtained optimal p-connected packet pair partition coefficients path graphs permutation graphs phase planar graph polynomial problem processors Proof relationship type result routing schemes satisfying set of vertices shortest path simplicial solution spanning tree step subset subtrees Theorem tree-decomposition treewidth unicast VC-dimension vertex vertex set