Title of article
Enumerative aspects of certain subclasses of perfect graphs Original Research Article
Author/Authors
Venkatesan Guruswami، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 1999
Pages
21
From page
97
To page
117
Abstract
We investigate the enumerative aspects of various classes of perfect graphs like cographs, split graphs, trivially perfect graphs and threshold graphs. For subclasses of permutation graphs like cographs and threshold graphs we also determine the number of permutations π of {1,2,…,n} such that the permutation graph G[π] belongs to that class. We establish an interesting bijection between permutations whose permutation graphs are cographs (P4-free graphs) and permutations that are obtainable using an output-restricted deque (Knuth, Art of Computer Programming, Vol I, Fundamental Algorithms) and thereby enumerate such permutations. We also prove that the asymptotic number of permutations of {1,2,…,n} whose permutation graphs are split graphs is Θ(4n/n). We also introduce a new class of graphs called C5-split graphs, characterize and enumerate them. C5-split graphs form a superclass of split graphs and are not necessarily perfect. All the classes of graphs that we enumerate have a finite family of small forbidden induced subgraphs.
Keywords
Generating functions , Perfect graph , Output-restricted deque , Permutation graph , Cograph , Young tableaux , isomorphism , Polyaיs enumeration theory
Journal title
Discrete Mathematics
Serial Year
1999
Journal title
Discrete Mathematics
Record number
950902
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