Authors: | Cvetković, Dragoš Rowlinson, Peter Simić, Slobodan |
Title: | Graphs with Least Eigenvalue - 2: The Star Complement Technique | Journal: | Journal of Algebraic Combinatorics | Volume: | 14 | Issue: | 1 | First page: | 5 | Last page: | 16 | Issue Date: | 1-Jan-2001 | Rank: | M21a | ISSN: | 0925-9899 | DOI: | 10.1023/A:1011209801191 | Abstract: | Let G be a connected graph with least eigenvalue -2, of multiplicity k. A star complement for -2 in G is an induced subgraph H = G - X such that |X| = k and -2 is not an eigenvalue of H. In the case that G is a generalized line graph, a characterization of such subgraphs is used to decribe the eigenspace of -2. In some instances, G itself can be characterized by a star complement. If G is not a generalized line graph, G is an exceptional graph, and in this case it is shown how a star complement can be used to construct G without recourse to root systems. |
Keywords: | Eigenspace | Eigenvalue | Graph | Publisher: | Springer Link | Project: | EPSRC, Grant GR/L94901 |
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