Practical Stabilization of Passive Nonlinear Systems with Limited Control

“…Specifically, we study nearest-neighbor distributed control for consensus and distance-based formation control problems. We emphasize that the notion of nearestneighbor control is consistent with the prior work in [19]- [20] and it is not related to the notion of neighbors in the graph of multi-agent systems. We show the practical stability property of the closed-loop system where the usual consensus and distance-based formation Lyapunov function are used in the analysis.…”

“…for all t ≥ 0 and for some c 2 > 0. Combining this with (19), we get ∥D z e∥ = e ⊤ D z e ≥ c 2 ∥e∥. Hence we can conclude that in the invariant set Ψ, we have ∥e∥ ≤ 1 c 2 ∥D z e∥ ≤ δ c 2 .…”

“…In [19], [20], these quantization operators are considered as nearest-neighbor operators that map the input value to the available points in a given discrete set , which can have a finite or infinite number of members. The authors study the use of with minimal cardinality such that the closed-loop systems are practically stable.…”

“…In this letter, we present the application of nearestneighbor control to the cooperative control of multi-agent systems. We study the combination of the nearest-neighbor approach studied in [19], [20] and the standard distributed continuous control laws for multi agent-cooperation as in [5], [10], [12]. Specifically, we study nearest-neighbor distributed control for consensus and distance-based formation control problems.…”

Cooperative Nearest-Neighbor Control of Multi-Agent Systems: Consensus and Formation Control Problems

“…Specifically, we study nearest-neighbor distributed control for consensus and distance-based formation control problems. We emphasize that the notion of nearestneighbor control is consistent with the prior work in [19]- [20] and it is not related to the notion of neighbors in the graph of multi-agent systems. We show the practical stability property of the closed-loop system where the usual consensus and distance-based formation Lyapunov function are used in the analysis.…”

“…for all t ≥ 0 and for some c 2 > 0. Combining this with (19), we get ∥D z e∥ = e ⊤ D z e ≥ c 2 ∥e∥. Hence we can conclude that in the invariant set Ψ, we have ∥e∥ ≤ 1 c 2 ∥D z e∥ ≤ δ c 2 .…”

“…In [19], [20], these quantization operators are considered as nearest-neighbor operators that map the input value to the available points in a given discrete set , which can have a finite or infinite number of members. The authors study the use of with minimal cardinality such that the closed-loop systems are practically stable.…”

“…In this letter, we present the application of nearestneighbor control to the cooperative control of multi-agent systems. We study the combination of the nearest-neighbor approach studied in [19], [20] and the standard distributed continuous control laws for multi agent-cooperation as in [5], [10], [12]. Specifically, we study nearest-neighbor distributed control for consensus and distance-based formation control problems.…”

Cooperative Nearest-Neighbor Control of Multi-Agent Systems: Consensus and Formation Control Problems

“…In Chapter 3 [66,67], these quantization operators are considered as nearest-action operators that map the input value to the available points in a given discrete set U , which can have a finite or infinite number of members. We have shown that for a generic class of m-dimensional passive systems having proper storage function and satisfying the nonlinear large-time initial-state norm observablility condition 1 , it can be practically stabilized using only m + 2 control actions.…”

Practical Stabilization of Systems With Countable Set of Actions

Nearest neighbor control for practical stabilization of passive nonlinear systems