On the stability of unbounded differential equations in fuzzy k-normed spaces via fixed point method

Madadi, M.; Saadati, Reza

doi:10.30495/jnrm.2021.17086

Manuscript ID : JNRM-2002-1841 (R7) Visit : 138 Page: 49 - 58

10.30495/jnrm.2021.17086

Article Type: Original Research

On the stability of unbounded differential equations in fuzzy k-normed spaces via fixed point method

Subject Areas : Statistics

M. Madadi ¹ (Department of Mathematics, Science and Research Branch, Islamic Azad University, Tehran, Iran)
Reza Saadati ² (Iran University of Science and Technology)

Received: 2020-02-26 Accepted : 2021-02-17 Published : 2021-11-22

Keywords: فضاهای k- نرم دار فازی, اولام- راسیاس, معادله دیفرانسیل, پایداری هایرز &ndash, اولام, معادله انتگرالی,

Abstract :

First, using triangular norms and fuzzy sets, we define fuzzy k - normed spaces and then we study the stability of a class of differential equations. We apply a fixed point theorem to prove our stability results. Radu was the first mathematician who applied the fixed point method to prove the stability of functional equations both in normed spaces and random normed spaces. We consider the differential equation υ ʹ (ν ) = Г(ν, υ(ν)),which the related integral equation is υ (ν) = υ (m) - ∫_m^ν Г(τ, υ(τ)) dτ.In this article, by a fuzzy control function, we make stable the pseudo integral equation related to the differential equation. Next, we get an approximation for the pseudo integral equation by using the fixed point method. These results prove‎ Hyers - Ulam - Rassias stability and Hyers - Ulam stability in fuzzy k- normed spaces via fixed point method‎.

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