Exponential mean-square stability of numerical solutions for stochastic delay integro-differential equations with Poisson jump

Ahmadian, Davood; Rouz, Omid Farkhondeh

doi:10.1186/s13660-020-02452-3

J Inequal Appl

2020

DOI: 10.1186/s13660-020-02452-3

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Exponential mean-square stability of numerical solutions for stochastic delay integro-differential equations with Poisson jump

Davood Ahmadian

Omid Farkhondeh Rouz

Abstract: In this paper, we investigate the exponential mean-square stability for both the solution of n-dimensional stochastic delay integro-differential equations (SDIDEs) with Poisson jump, as well for the split-step θ-Milstein (SSTM) scheme implemented of the proposed model. First, by virtue of Lyapunov function and continuous semi-martingale convergence theorem, we prove that the considered model has the property of exponential mean-square stability. Moreover, it is shown that the SSTM scheme can inherit the expone… Show more

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Cited by 3 publications

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Stabilization of stochastic regime-switching Poisson jump equations by delay feedback control

2022

J Inequal Appl

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This paper is concerned with the stabilization of stochastic regime-switching Poisson jump equations (also known as stochastic differential equations with Markovian switching and Poisson jumps, abbreviated as SDEwMJs). The aim of this paper is to design a feedback controller with delay δ ($\delta >0$ δ > 0 ) to make an unstable SDEwMJ become stable. It is proved that the delay δ is bounded by a constant δ̄. Moreover, an implicit lower bound for $\bar{\delta ,}$ δ , ¯ which can be computed numerically, is provided. As a product, the almost sure exponential stability of the controlled SDEwMJ is obtained. Besides, an example is given to demonstrate the theoretical results.

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Stabilization of stochastic regime-switching Poisson jump equations by delay feedback control

2022

J Inequal Appl

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Null controllability of Hilfer fractional stochastic integrodifferential equations with noninstantaneous impulsive and Poisson jump

Alnafisah

Ahmed

2021

International Journal of Nonlinear Sciences and Numerical Simulation

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In this paper, we investigate the sufficient conditions for null controllability of noninstantaneous impulsive Hilfer fractional stochastic integrodifferential system with the Rosenblatt process and Poisson jump. The required results are obtained based on fractional calculus, stochastic analysis, and Sadovskii’s fixed point theorem. Finally, an example is given to illustrate the obtained results.

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Almost Sure Exponential Stability of Numerical Solutions for Stochastic Pantograph Differential Equations with Poisson Jumps

Abou-Senna

Tian²

2022

Mathematics

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The stability analysis of the numerical solutions of stochastic models has gained great interest, but there is not much research about the stability of stochastic pantograph differential equations. This paper deals with the almost sure exponential stability of numerical solutions for stochastic pantograph differential equations interspersed with the Poisson jumps by using the discrete semimartingale convergence theorem. It is shown that the Euler–Maruyama method can reproduce the almost sure exponential stability under the linear growth condition. It is also shown that the backward Euler method can reproduce the almost sure exponential stability of the exact solution under the polynomial growth condition and the one-sided Lipschitz condition. Additionally, numerical examples are performed to validate our theoretical result.

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Exponential mean-square stability of numerical solutions for stochastic delay integro-differential equations with Poisson jump

Cited by 3 publications

References 32 publications

Stabilization of stochastic regime-switching Poisson jump equations by delay feedback control

Stabilization of stochastic regime-switching Poisson jump equations by delay feedback control

Null controllability of Hilfer fractional stochastic integrodifferential equations with noninstantaneous impulsive and Poisson jump

Almost Sure Exponential Stability of Numerical Solutions for Stochastic Pantograph Differential Equations with Poisson Jumps

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