Abstract
In multi-agent systems with increasing communication distances, the communication delay is time-varying and unbounded. In this paper, we describe the multi-agent system with increasing communication distances as the discrete-time system with non-distributed unbounded time-varying delays and study the consensus problem of the system via the distributed control. This paper uses a time-delay system to model the discrete-time system, and the maximum delay in the time-delay system tends to infinity as time goes on. Furthermore, caused by this property, most of convergence analysis methods for bounded time-delay systems are ineffective. Hence, for any finite integer k>0, the finite-dimensional augmented model of the time-delay system is built in the interval [0,k] to study the system state. Under the weaker topological assumption that the topology containing a spanning tree, the system is proved to achieve a consensus if the growth rate of the maximum delay satisfies some mild constraints, which also are constraints on the growth rate of the maximum communication distance between agents. Furthermore, we characterize that the rate of the system achieving a consensus and the growth rate of the maximum delay are negatively correlated. In other words, the rate of the system achieving a consensus and the growth rate of the maximum communication distance between agents are negatively correlated.
Highlights
The multi-agent system has become a very popular topic in the control community in recent years
The consensus problem of multi-agent systems is studied with nondistributed unbounded time-delays caused by the growth of communication distances
For any finite integer k > 0, the finite-dimensional augmented model of the time-delay system is built in the interval [0, k] to study the system state
Summary
The multi-agent system has become a very popular topic in the control community in recent years. This paper mainly studies the influence of the time-delay caused by the communication distance on the consensus of the distributed multi-agent system. These finite dimensional system models are used to study the system state By using this method, under the fixed directed topology containing a spanning tree, which is weaker than topology assumptions in existing results (see [25,26]), the system is proved to achieve a consensus, if a mild assumption satisfied by the rate of the maximum delay tending to infinity. These theoretical results are verified by simulation results These results are applicable to the multi-agent system with increasing communication distances, and to any multi-agent system that can be described as the multi-agent system with non-distributed unbounded time-varying delays. The time-delay system model of the multi-agent system with increasing communication distances is introduced. The length of this directed path is the number of directed edges that make up this directed path, i.e., k + 1. dis(i, j) represents the distance from the agent i to the agent j, which is the length of the shortest directed path from the agent i to the agent j
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