Hyers-Ulam stability of fractional stochastic differential equations with random impulse

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Published Nov 26, 2022

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S. Varshini
Department of Mathematics, PSG College of Arts and Science, Coimbatore, India
K. Banupriya
Department of Mathematics with Computer Applications, PSG College of Arts and Science, Coimbatore, India
K. Ramkumar
Department of Mathematics with Computer Applications, PSG College of Arts and Science, Coimbatore, India
K. Ravikumar
Department of Mathematics, PSG College of Arts and Science, Coimbatore, India
Dumitru Baleanu
Department of Mathematics, Cankaya University, Ankara, Turkey

Abstract

The goal of this study is to derive a class of random impulsive fractional stochastic differential equations with finite delay that are of Caputo-type. Through certain constraints, the existence of the mild solution of the aforementioned system are acquired by Kransnoselskii's fixed point theorem. Furthermore, through Ito isometry and Gronwall's inequality, the Hyers-Ulam stability of the reckoned system is evaluated using Lipschitz condition.

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How to Cite
Varshini, S., Banupriya, K., Ramkumar, K., Ravikumar, K., & Baleanu, D. (2022). Hyers-Ulam stability of fractional stochastic differential equations with random impulse. Acta Mathematica Universitatis Comenianae, 91(4), 351-364. Retrieved from http://www.iam.fmph.uniba.sk/amuc/ojs/index.php/amuc/article/view/1814/960
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Vol 91 No 4 (2022): AMUC
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Articles