Graph realizations associated with minimizing the maximum eigenvalue of the Laplacian
成果类型:
Article
署名作者:
Goering, Frank; Helmberg, Christoph; Reiss, Susanna
署名单位:
Technische Universitat Chemnitz
刊物名称:
MATHEMATICAL PROGRAMMING
ISSN/ISSBN:
0025-5610
DOI:
10.1007/s10107-010-0344-z
发表日期:
2012
页码:
95-111
关键词:
spectral-radius
bounds
摘要:
In analogy to the absolute algebraic connectivity of Fiedler, we study the problem of minimizing the maximum eigenvalue of the Laplacian of a graph by redistributing the edge weights. Via semidefinite duality this leads to a graph realization problem in which nodes should be placed as close as possible to the origin while adjacent nodes must keep a distance of at least one. We prove three main results for a slightly generalized form of this embedding problem. First, given a set of vertices partitioning the graph into several or just one part, the barycenter of each part is embedded on the same side of the affine hull of the set as the origin. Second, there is an optimal realization of dimension at most the tree-width of the graph plus one and this bound is best possible in general. Finally, bipartite graphs possess a one dimensional optimal embedding.