Chordal graphs with bounded tree-width

Abstract

Given t≥ 2 and 0≤ k≤ t, we prove that the number of labelled k-connected chordal graphs with n vertices and tree-width at most t is asymptotically c n-5/2 γn n!, as n∞, for some constants c,γ >0 depending on t and k. Additionally, we show that the number of i-cliques (2≤ i≤ t) in a uniform random k-connected chordal graph with tree-width at most t is normally distributed as n∞. The asymptotic enumeration of graphs of tree-width at most t is wide open for t≥ 3. To the best of our knowledge, this is the first non-trivial class of graphs with bounded tree-width where the asymptotic counting problem is solved. Our starting point is the work of Wormald [Counting Labelled Chordal Graphs, Graphs and Combinatorics (1985)], were an algorithm is developed to obtain the exact number of labelled chordal graphs on n vertices.

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