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Bibliographic Details
Main Authors: Rao, P Raghavendra, Vyavahare, Pooja
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2412.15681
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author Rao, P Raghavendra
Vyavahare, Pooja
author_facet Rao, P Raghavendra
Vyavahare, Pooja
contents We study the distributed consensus of state vectors in a discrete-time multi-agent network with matrix edge weights using stochastic matrix convergence theory. We present a distributed asynchronous time update model wherein one randomly selected agent updates its state vector at a time by interacting with its neighbors. We prove that all agents converge to same state vector almost surely when every edge weight matrix is positive definite. We study vector consensus in cooperative-competitive networks with edge weights being either positive or negative definite matrices and present a necessary and sufficient condition to achieve bipartite vector consensus in such networks. We study the network structures on which agents achieve zero consensus. We also present a convergence result on nonhomogenous matrix products which is of independent interest in matrix convergence theory. All the results hold true for the synchronous time update model as well in which all agents update their states simultaneously.
format Preprint
id arxiv_https___arxiv_org_abs_2412_15681
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Asynchronous Vector Consensus over Matrix-Weighted Networks
Rao, P Raghavendra
Vyavahare, Pooja
Systems and Control
We study the distributed consensus of state vectors in a discrete-time multi-agent network with matrix edge weights using stochastic matrix convergence theory. We present a distributed asynchronous time update model wherein one randomly selected agent updates its state vector at a time by interacting with its neighbors. We prove that all agents converge to same state vector almost surely when every edge weight matrix is positive definite. We study vector consensus in cooperative-competitive networks with edge weights being either positive or negative definite matrices and present a necessary and sufficient condition to achieve bipartite vector consensus in such networks. We study the network structures on which agents achieve zero consensus. We also present a convergence result on nonhomogenous matrix products which is of independent interest in matrix convergence theory. All the results hold true for the synchronous time update model as well in which all agents update their states simultaneously.
title Asynchronous Vector Consensus over Matrix-Weighted Networks
topic Systems and Control
url https://arxiv.org/abs/2412.15681