Growing Well-connected Graphs

Author

Ghosh, Arpita ; Boyd, Stephen

Author_Institution

Inf. Syst. Lab., Stanford Univ., Palo Alto, CA

fYear

2006

fDate

13-15 Dec. 2006

Firstpage

6605

Lastpage

6611

Abstract

The algebraic connectivity of a graph is the second smallest eigenvalue of the graph Laplacian, and is a measure of how well-connected the graph is. We study the problem of adding edges (from a set of candidate edges) to a graph so as to maximize its algebraic connectivity. This is a difficult combinatorial optimization, so we seek a heuristic for approximately solving the problem. The standard convex relaxation of the problem can be expressed as a semidefinite program (SDP); for modest sized problems, this yields a cheaply computable upper bound on the optimal value, as well as a heuristic for choosing the edges to be added. We describe a new greedy heuristic for the problem. The heuristic is based on the Fiedler vector, and therefore can be applied to very large graphs

Keywords

eigenvalues and eigenfunctions; graph theory; optimisation; Fiedler vector; algebraic connectivity; combinatorial optimization; convex relaxation; eigenvalue; graph Laplacian; greedy heuristic; semidefinite program; well-connected graphs; Control systems; Eigenvalues and eigenfunctions; Information systems; Joining processes; Laboratories; Laplace equations; Robust stability; USA Councils; Upper bound; Vectors;

fLanguage

English

Publisher

ieee

Conference_Titel

Decision and Control, 2006 45th IEEE Conference on

Conference_Location

San Diego, CA

Print_ISBN

1-4244-0171-2

Type

conf

DOI

10.1109/CDC.2006.377282

Filename

4177113