Author:
Alqudah Manar A.,Boulares Hamid,Abdalla Bahaaeldin,Abdeljawad Thabet
Abstract
AbstractIn this manuscript, we study an averaging principle for fractional stochastic pantograph differential equations (FSDPEs) in the $$\psi $$
ψ
-sense accompanied by Brownian movement. Under certain assumptions, we are able to approximate solutions for FSPEs by solutions to averaged stochastic systems in the sense of mean square. Analysis of system solutions before and after the average allows extending the classical Khasminskii approach to random fractional differential equations in the sense of $$\psi $$
ψ
-Caputo. For clarity, we present at the end an applied example to facilitate the clarification of the theoretical results obtained
Funder
Sefako Makgatho Health Sciences University
Publisher
Springer Science and Business Media LLC
Cited by
3 articles.
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