Title
New results on robust exponential stability of integral delay systems
11627/386311627/3863
Author
Melchor Aguilar, Daniel Alejandro
Abstract
"The robust exponential stability of integral delay systems with exponential kernels is investigated. Sufficient delay-dependent robust conditions expressed in terms of linear matrix inequalities and matrix norms are derived by using the Lyapunov–Krasovskii functional approach. The results are combined with a new result on quadratic stabilisability of the state-feedback synthesis problem in order to derive a new linear matrix inequality methodology of designing a robust non-fragile controller for the finite spectrum assignment of input delay systems that guarantees simultaneously a numerically safe implementation and also the robustness to uncertainty in the system matrices and to perturbation in the feedback gain."
Publication date
2016-06Publication type
articleDOI
https://doi.org/10.1080/00207721.2014.958205Knowledge area
MATEMÁTICASEditor
Taylor & FrancisKeywords
Integral delay systemsRobust exponential stability
Lyapunov–Krasovskii functionals