標題: | On the largest eigenvalues of bipartite graphs which are nearly complete |
作者: | Chen, Yi-Fan Fu, Hung-Lin Kim, In-Jae Stehr, Eryn Watts, Brendon 應用數學系 Department of Applied Mathematics |
關鍵字: | Bipartite graph;Eigenvector;Largest eigenvalue |
公開日期: | 15-Jan-2010 |
摘要: | For positive integers p, q, r, s and t satisfying rt <= p and st <= q, let G(p, q; r, s; t) be the bipartite graph with partite sets {u(1), ..., u(p)} and {v(1), ..., v(q)} such that u(i) and v(j) are not adjacent if and only if there exists a positive integer k with 1 <= k <= t such that (k - 1)r + 1 <= i <= kr and (k - 1)s + 1 <= j <= ks. In this paper we study the largest eigenvalues of bipartite graphs which are nearly complete. We first compute the largest eigenvalue (and all other eigenvalues) of G(p, q: r, s: t), and then list nearly complete bipartite graphs according to the magnitudes of their largest eigenvalues. These results give an affirmative answer to [1, Conjecture 1.2] when the number of edges of a bipartite graph with partite sets U and V, having vertical bar U vertical bar = p and vertical bar V vertical bar = q for p <= q, is pq - 2. Furthermore, we refine [1, Conjecture 1.2] for the case when the number of edges is at least pq - p + 1. (C) 2009 Elsevier Inc. All rights reserved. |
URI: | http://dx.doi.org/10.1016/j.laa.2009.09.008 http://hdl.handle.net/11536/5963 |
ISSN: | 0024-3795 |
DOI: | 10.1016/j.laa.2009.09.008 |
期刊: | LINEAR ALGEBRA AND ITS APPLICATIONS |
Volume: | 432 |
Issue: | 2-3 |
起始頁: | 606 |
結束頁: | 614 |
Appears in Collections: | Articles |
Files in This Item:
If it is a zip file, please download the file and unzip it, then open index.html in a browser to view the full text content.