Results 71 to 80 of about 4,699 (199)
Practical Stability in terms of Two Measures for Impulsive Differential Equations with “Supremum”
The object of investigations is a system of impulsive differential equations with “supremum.” These equations are not widely studied yet, and at the same time they are adequate mathematical model of many real world processes in which the present state ...
S. G. Hristova, A. Georgieva
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Asymptotic properties of a stochastic nonautonomous competitive system with impulsive perturbations
In this paper, a generalized nonautonomous stochastic competitive system with impulsive perturbations is studied. By the theories of impulsive differential equations and stochastic differential equations, we have established some asymptotic properties of
Liu Yang, Baodan Tian
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We establish sufficient conditions for the existence of solutions for a nonlinear impulsive multi-order Caputo-type generalized fractional differential equation with infinite delay and nonlocal generalized integro-initial value conditions.
Ravi P. Agarwal +3 more
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On the oscillation of some impulsive parabolic equations with several delays [PDF]
summary:In this paper, several oscillation criteria are established for some nonlinear impulsive functional parabolic equations with several delays subject to boundary conditions.
Liu, Xinzhi +4 more
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We define the notions of impulsive evolution processes and their pullback attractors, and exhibit conditions under which a given impulsive evolution process has a pullback attractor.
Uzal Couselo, José Manuel +1 more
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Asymptotic solutions of differential equations with singular impulses
The paper considers impulsive systems with singularities. The main novelty is that beside the singularity of the differential equation, the impulsive equation is a singular one. The method of boundary functions is applied to obtain the main result. Examples with simulations confirming the theoretical results are given.
Aviltay, Nauryzbay +2 more
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On delay differential equations with impulses
The authors' summary: Sufficient conditions are obtained respectively for the asymptotic stability of the trivial solution of \[ \dot x(t)+ax(t- \tau)=\sum^{\infty}_{j=1}b_ jx(t_ j-\tau)(t-t_ j),\quad t\neq t_ j, \] and for the existence of a nonoscillatory solution; conditions are also obtained for all solutions to be oscillatory.
Gopalsamy, K, Zhang, B.G
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Impulsive Delayed Lasota–Wazewska Fractional Models: Global Stability of Integral Manifolds
In this paper we deal with the problems of existence, boundedness and global stability of integral manifolds for impulsive Lasota–Wazewska equations of fractional order with time-varying delays and variable impulsive perturbations. The main results
Gani Stamov, Ivanka Stamova
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Pseudo almost periodicity of fractional integro-differential equations with impulsive effects in Banach spaces [PDF]
summary:In this paper, for the impulsive fractional integro-differential equations involving Caputo fractional derivative in Banach space, we investigate the existence and uniqueness of a pseudo almost periodic $PC$-mild solution.
Xia, Zhinan
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This paper is mainly concerned with the existence, stability, and bifurcations of periodic solutions of a certain scalar impulsive differential equations on Moebius stripe.
Yefeng He, Yepeng Xing
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