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dc.contributor.authorStamov, Gani
dc.contributor.authorStamova, Ivanka
dc.contributor.authorLi, Xiaodi
dc.contributor.authorGospodinova, Ekaterina
dc.date.accessioned2021-04-19T15:15:48Z
dc.date.available2021-04-19T15:15:48Z
dc.date.issued7/21/2019
dc.identifierdoi: 10.3390/math7070656
dc.identifier.citationMathematics 7 (7): 656 (2019)
dc.identifier.urihttps://hdl.handle.net/20.500.12588/454
dc.description.abstractThe present paper is devoted to the problems of practical stability with respect to <i>h</i>-manifolds for impulsive control differential equations with variable impulsive perturbations. We will consider these problems in light of the Lyapunov&ndash;Razumikhin method of piecewise continuous functions. The new results are applied to an impulsive control cellular neural network model with variable impulsive perturbations.
dc.titlePractical Stability with Respect to h-Manifolds for Impulsive Control Functional Differential Equations with Variable Impulsive Perturbations
dc.date.updated2021-04-19T15:15:49Z


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