On Nonlinear Forced Impulsive Differential Equations under Canonical and Non-Canonical Conditions

This study is connected with the nonoscillatory and oscillatory behaviour to the solutions of nonlinear neutral impulsive systems with forcing term which is studied for various ranges of of the neutral coefficient. Furthermore, sufficient conditions are obtained for the existence of positive bounded...

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Auteurs principaux:	Shyam Sundar Santra, Hammad Alotaibi, Samad Noeiaghdam, Denis Sidorov
Format:	article
Langue:	EN
Publié:	MDPI AG 2021
Sujets:	lebesgue’s dominated converges theorem (LDCT) Banach fixed point theorem oscillation neutral nonoscillation impulsive systems Mathematics QA1-939
Accès en ligne:	https://doaj.org/article/125f6fa20172401d9a4998925d90516e
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id	oai:doaj.org-article:125f6fa20172401d9a4998925d90516e
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spelling	oai:doaj.org-article:125f6fa20172401d9a4998925d90516e2021-11-25T19:06:27ZOn Nonlinear Forced Impulsive Differential Equations under Canonical and Non-Canonical Conditions10.3390/sym131120662073-8994https://doaj.org/article/125f6fa20172401d9a4998925d90516e2021-11-01T00:00:00Zhttps://www.mdpi.com/2073-8994/13/11/2066https://doaj.org/toc/2073-8994This study is connected with the nonoscillatory and oscillatory behaviour to the solutions of nonlinear neutral impulsive systems with forcing term which is studied for various ranges of of the neutral coefficient. Furthermore, sufficient conditions are obtained for the existence of positive bounded solutions of the impulsive system. The mentioned example shows the feasibility and efficiency of the main results.Shyam Sundar SantraHammad AlotaibiSamad NoeiaghdamDenis SidorovMDPI AGarticlelebesgue’s dominated converges theorem (LDCT)Banach fixed point theoremoscillationneutralnonoscillationimpulsive systemsMathematicsQA1-939ENSymmetry, Vol 13, Iss 2066, p 2066 (2021)
institution	DOAJ
collection	DOAJ
language	EN
topic	lebesgue’s dominated converges theorem (LDCT) Banach fixed point theorem oscillation neutral nonoscillation impulsive systems Mathematics QA1-939
spellingShingle	lebesgue’s dominated converges theorem (LDCT) Banach fixed point theorem oscillation neutral nonoscillation impulsive systems Mathematics QA1-939 Shyam Sundar Santra Hammad Alotaibi Samad Noeiaghdam Denis Sidorov On Nonlinear Forced Impulsive Differential Equations under Canonical and Non-Canonical Conditions
description	This study is connected with the nonoscillatory and oscillatory behaviour to the solutions of nonlinear neutral impulsive systems with forcing term which is studied for various ranges of of the neutral coefficient. Furthermore, sufficient conditions are obtained for the existence of positive bounded solutions of the impulsive system. The mentioned example shows the feasibility and efficiency of the main results.
format	article
author	Shyam Sundar Santra Hammad Alotaibi Samad Noeiaghdam Denis Sidorov
author_facet	Shyam Sundar Santra Hammad Alotaibi Samad Noeiaghdam Denis Sidorov
author_sort	Shyam Sundar Santra
title	On Nonlinear Forced Impulsive Differential Equations under Canonical and Non-Canonical Conditions
title_short	On Nonlinear Forced Impulsive Differential Equations under Canonical and Non-Canonical Conditions
title_full	On Nonlinear Forced Impulsive Differential Equations under Canonical and Non-Canonical Conditions
title_fullStr	On Nonlinear Forced Impulsive Differential Equations under Canonical and Non-Canonical Conditions
title_full_unstemmed	On Nonlinear Forced Impulsive Differential Equations under Canonical and Non-Canonical Conditions
title_sort	on nonlinear forced impulsive differential equations under canonical and non-canonical conditions
publisher	MDPI AG
publishDate	2021
url	https://doaj.org/article/125f6fa20172401d9a4998925d90516e
work_keys_str_mv	AT shyamsundarsantra onnonlinearforcedimpulsivedifferentialequationsundercanonicalandnoncanonicalconditions AT hammadalotaibi onnonlinearforcedimpulsivedifferentialequationsundercanonicalandnoncanonicalconditions AT samadnoeiaghdam onnonlinearforcedimpulsivedifferentialequationsundercanonicalandnoncanonicalconditions AT denissidorov onnonlinearforcedimpulsivedifferentialequationsundercanonicalandnoncanonicalconditions
_version_	1718410261692416000

On Nonlinear Forced Impulsive Differential Equations under Canonical and Non-Canonical Conditions

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