Title :
Finite-Time Consensus Using Stochastic Matrices With Positive Diagonals
Author :
Hendrickx, Julien M. ; Guodong Shi ; Johansson, Karl H.
Author_Institution :
ICTEAM Inst., Univ. Catholique de Louvain, Louvain la Neuve, Belgium
Abstract :
We discuss the possibility of reaching consensus in finite time using only linear iterations, with the additional restrictions that the update matrices must be stochastic with positive diagonals and consistent with a given graph structure. We show that finite-time average consensus can always be achieved for connected undirected graphs. For directed graphs, we show some necessary conditions for finite-time consensus, including strong connectivity and the presence of a simple cycle of even length.
Keywords :
directed graphs; graph theory; matrix algebra; mobile robots; stochastic processes; connected undirected graphs; directed graphs; finite-time average consensus; graph structure; linear iterations; matrix update; necessary conditions; positive diagonals; strong connectivity; Autonomous agents; Conferences; Convergence; Educational institutions; Indexes; Optimization; Signal processing algorithms; Agents and autonomous systems; finite-time consensus; sensor networks;
Journal_Title :
Automatic Control, IEEE Transactions on
DOI :
10.1109/TAC.2014.2352691
