Laplacian spectrum of weakly quasi-threshold graphs

Bapat, R. B. ; Lal, A. K. ; Pati, Sukanta (2008) Laplacian spectrum of weakly quasi-threshold graphs Graphs and Combinatorics, 24 (4). pp. 273-290. ISSN 0911-0119

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Official URL: http://www.springerlink.com/content/q6880741201m3u...

Related URL: http://dx.doi.org/10.1007/s00373-008-0785-9

Abstract

In this paper we study the class of weakly quasi-threshold graphs that are obtained from a vertex by recursively applying the operations (i) adding a new isolated vertex, (ii) adding a new vertex and making it adjacent to all old vertices, (iii) disjoint union of two old graphs, and (iv) adding a new vertex and making it adjacent to all neighbours of an old vertex. This class contains the class of quasi-threshold graphs. We show that weakly quasi-threshold graphs are precisely the comparability graphs of a forest consisting of rooted trees with each vertex of a tree being replaced by an independent set. We also supply a quadratic time algorithm in the the size of the vertex set for recognizing such a graph. We completely determine the Laplacian spectrum of weakly quasi-threshold graphs. It turns out that weakly quasi-threshold graphs are Laplacian integral. As a corollary we obtain a closed formula for the number of spanning trees in such graphs. A conjecture of Grone and Merris asserts that the spectrum of the Laplacian of any graph is majorized by the conjugate of the degree sequence of the graph. We show that the conjecture holds for cographs.

Item Type:Article
Source:Copyright of this article belongs to Springer.
Keywords:Quasi-threshold Graphs; Weakly quasi-threshold Graphs; Cographs; Laplacian Matrix; Degree Sequence
ID Code:78321
Deposited On:19 Jan 2012 06:33
Last Modified:19 Jan 2012 06:33

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