沉降时间
动力系统理论
班级(哲学)
李雅普诺夫函数
计算机科学
趋同(经济学)
控制器(灌溉)
控制理论(社会学)
模式(计算机接口)
上下界
数学优化
功能(生物学)
理论(学习稳定性)
数学
控制(管理)
控制工程
非线性系统
工程类
人工智能
数学分析
农学
经济增长
经济
阶跃响应
进化生物学
量子力学
物理
机器学习
操作系统
生物
作者
Juan Diego Sánchez‐Torres,David Gómez‐Gutiérrez,Esteban López,Alexander G. Loukianov
标识
DOI:10.1093/imamci/dnx004
摘要
This article introduces predefined-time stable dynamical systems which are a class of fixed-time stable dynamical systems with settling time as an explicit parameter that can be defined in advance. This concept allows for the design of observers and controllers for problems that require to fulfil hard time constraints. An example is encountered in the fault detection and isolation problem, where mode detection in a timely manner needs to be guaranteed in order to apply a recovery action. Furthermore, through the notion of strong predefined-time stability, the approach hereinafter presented permits to overcome the problem of overestimation of the convergence time bound encountered in previous methods for the analysis of finite-time stable systems, where the stabilization time is often an unbounded function of the initial conditions of the system. A Lyapunov analysis is provided together with a detailed discussion of the applications to consensus and first order sliding mode controller design.
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