Finite-time stability of neutral fractional-order time-varying delay systems with nonlinear parameter uncertainties and perturbations
Апстракт
In this contribution, the problem of finite-time stability for a class of neutral fractional-order time-varying delay systems with nonlinear parameter uncertainties and perturbations is investigated.
By use of the extended form of generalized Gronwall inequality, a new sufficient condition for
robust finite-time stability of such systems is obtained. Finally, a numerical example is provided
to illustrate the effectiveness and applicability of the proposed theoretical results.
Кључне речи:
finite-time stability / fractional order / nonlinear / neutral / time-varying delay / perturbed systemsИзвор:
8th International Congress of Serbian Society of Mechanics, Kragujevac, Serbia, June 28-30. 2021., 2021, 652-661Издавач:
- Beograd : Srpsko društvo za mehaniku
Финансирање / пројекти:
- Министарство науке, технолошког развоја и иновација Републике Србије, институционално финансирање - 200105 (Универзитет у Београду, Машински факултет) (RS-MESTD-inst-2020-200105)
- Serbia-Italian bilateral project ADFOCMEDER
Колекције
Институција/група
Mašinski fakultetTY - CONF AU - Lazarević, Mihailo AU - Radojević, Darko AU - Maione, Guido AU - Pišl, Stjepko PY - 2021 UR - https://machinery.mas.bg.ac.rs/handle/123456789/4091 AB - In this contribution, the problem of finite-time stability for a class of neutral fractional-order time-varying delay systems with nonlinear parameter uncertainties and perturbations is investigated. By use of the extended form of generalized Gronwall inequality, a new sufficient condition for robust finite-time stability of such systems is obtained. Finally, a numerical example is provided to illustrate the effectiveness and applicability of the proposed theoretical results. PB - Beograd : Srpsko društvo za mehaniku C3 - 8th International Congress of Serbian Society of Mechanics, Kragujevac, Serbia, June 28-30. 2021. T1 - Finite-time stability of neutral fractional-order time-varying delay systems with nonlinear parameter uncertainties and perturbations EP - 661 SP - 652 UR - https://hdl.handle.net/21.15107/rcub_machinery_4091 ER -
@conference{ author = "Lazarević, Mihailo and Radojević, Darko and Maione, Guido and Pišl, Stjepko", year = "2021", abstract = "In this contribution, the problem of finite-time stability for a class of neutral fractional-order time-varying delay systems with nonlinear parameter uncertainties and perturbations is investigated. By use of the extended form of generalized Gronwall inequality, a new sufficient condition for robust finite-time stability of such systems is obtained. Finally, a numerical example is provided to illustrate the effectiveness and applicability of the proposed theoretical results.", publisher = "Beograd : Srpsko društvo za mehaniku", journal = "8th International Congress of Serbian Society of Mechanics, Kragujevac, Serbia, June 28-30. 2021.", title = "Finite-time stability of neutral fractional-order time-varying delay systems with nonlinear parameter uncertainties and perturbations", pages = "661-652", url = "https://hdl.handle.net/21.15107/rcub_machinery_4091" }
Lazarević, M., Radojević, D., Maione, G.,& Pišl, S.. (2021). Finite-time stability of neutral fractional-order time-varying delay systems with nonlinear parameter uncertainties and perturbations. in 8th International Congress of Serbian Society of Mechanics, Kragujevac, Serbia, June 28-30. 2021. Beograd : Srpsko društvo za mehaniku., 652-661. https://hdl.handle.net/21.15107/rcub_machinery_4091
Lazarević M, Radojević D, Maione G, Pišl S. Finite-time stability of neutral fractional-order time-varying delay systems with nonlinear parameter uncertainties and perturbations. in 8th International Congress of Serbian Society of Mechanics, Kragujevac, Serbia, June 28-30. 2021.. 2021;:652-661. https://hdl.handle.net/21.15107/rcub_machinery_4091 .
Lazarević, Mihailo, Radojević, Darko, Maione, Guido, Pišl, Stjepko, "Finite-time stability of neutral fractional-order time-varying delay systems with nonlinear parameter uncertainties and perturbations" in 8th International Congress of Serbian Society of Mechanics, Kragujevac, Serbia, June 28-30. 2021. (2021):652-661, https://hdl.handle.net/21.15107/rcub_machinery_4091 .