Existence of infinitely many anti-periodic solutions for second-order impulsive differential inclusions [PDF]
In this article, we establish the existence of infinitely many anti-periodic solutions for a second-order impulsive differential inclusion with a perturbed nonlinearity and two parameters.
Shapour Heidarkhani +3 more
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Antiperiodic Solutions for Impulsive ω-Weighted ϱ–Hilfer Fractional Differential Inclusions in Banach Spaces [PDF]
In this article, we construct sufficient conditions that secure the non-emptiness and compactness of the set of antiperiodic solutions of an impulsive fractional differential inclusion involving an ω-weighted ϱ–Hilfer fractional derivative, D0,tσ,v,ϱ,ω ...
Zainab Alsheekhhussain +3 more
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The Existence of Solutions for w-Weighted ψ-Hilfer Fractional Differential Inclusions of Order μ ∈ (1, 2) with Non-Instantaneous Impulses in Banach Spaces [PDF]
In this research, we obtain the sufficient conditions that guarantee that the set of solutions for an impulsive fractional differential inclusion involving a w-weighted ψ-Hilfer fractional derivative, D0,tσ,v,ψ,w,of order μ∈(1,2), in infinite dimensional
Zainab Alsheekhhussain +3 more
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In this paper, the problem of the uniform stability for a class of fractional-order fuzzy impulsive complex-valued neural networks with mixed delays in infinite dimensions is discussed for the first time.
Xin Liu, Lili Chen, Yanfeng Zhao
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Averaging method for impulsive differential inclusions with fuzzy right-hand side
In this paper the substantiation of the partial scheme of the averaging method for impulsive differential inclusions with fuzzy right-hand side in terms of R - solutions on the finite interval is considered.
N. V. Skripnik
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Impulse position control for differential inclusions [PDF]
The research was supported by Russian Foundation for Basic Research, project no. 16-01-00505.
Finogenko, I. A., Sesekin, A. N.
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The controllability of an impulsive integro-differential process with nonlocal feedback controls [PDF]
The controllability of an impulsive process governed by a parametric integro-differential equation involving a Volterra operator is shown. The model is studied via the existence of impulsive mild solutions for a semilinear integro-differential inclusion.
Paola Rubbioni, Tiziana Cardinali
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Impulsive differential inclusions with fractional order
The authors consider the Cauchy problem for a fractional impulsive differential inclusion: \[ \begin{cases} D^\alpha_*\in F(t,y(t)) \text{ a.e. } \, t\in J\backslash\{t_{1},\dots,t_{m}\},\\ y(t^+_k)=I_k(t^-_k),\; k=1,\dots,m,\\ y'(t^+_k)=\bar I_k(t^-_k),\; k=1,\dots,m,\\ y(0)=a, y'(0)=c, \end{cases} \] the case of fractional differential equations and ...
Johnny Henderson, Abdelghani Ouahab
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Boundary layer flow in the industrial applications such as extrusion processes is attributable to impulsive movement of an extensible moving surface. However, the velocity of the extruded surface may not necessarily be linear.
Nurul Amira Zainal +3 more
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Discrete Approximation of Impulsive Differential Inclusions [PDF]
The paper deals with the approximation of the solution set and the reachable sets of an impulsive differential inclusion with variable times of impulses. It is strongly connected to T. Donchev, ``Approximation of the Solution Set of Impulsive Systems", Lecture Notes in Comput. Sci. 4818 (2008) and is its continuation.
Baier, Robert, Donchev, Tzanko
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