Title :
Low-Order Spectral Analysis of the Kirchhoff Matrix for a Probabilistic Graph With a Prescribed Expected Degree Sequence
Author :
Preciado, Victor M. ; Verghese, George C.
Author_Institution :
Dept. of Electr. & Syst. Eng., Univ. of Pennsylvania, Philadelphia, PA
fDate :
6/1/2009 12:00:00 AM
Abstract :
We study the eigenvalue distribution of the Kirchhoff matrix of a large-scale probabilistic network with a prescribed expected degree sequence. This spectrum plays a key role in many dynamical and structural network problems such as synchronization of a network of oscillators. We introduce analytical expressions for the first three moments of the eigenvalue distribution of the Kirchhoff matrix, as well as a probabilistic asymptotic analysis of these moments for a graph with a prescribed expected degree sequence. These results are applied to the analysis of synchronization in a large-scale probabilistic network of oscillators.
Keywords :
eigenvalues and eigenfunctions; network analysis; oscillators; probability; spectral analysis; synchronisation; Kirchhoff matrix; dynamical network problem; eigenvalue distribution; expected degree sequence; low-order spectral analysis; oscillator network; probabilistic asymptotic analysis; probabilistic graph; probabilistic network; structural network problem; synchronization; Complex network; Kirchhoff matrix; random graph; spectral graph theory; synchronization;
Journal_Title :
Circuits and Systems I: Regular Papers, IEEE Transactions on
DOI :
10.1109/TCSI.2009.2023758
