• BEHAVIOR OF THE SOLUTIONS OF THE FUZZY DIFFERENTIAL EQUATION
Abstract
In this paper we consider the fuzzy differential equation of the form: x ́(t)=px(t)+qx([ωt]/ω) ,t∈[0,∞) and study the existence, the uniqueness and the unboundedness of the solutions of it. for this, we assume that p,q are constant real and ω is a constant natural numbers but initial value x_0 is a fuzzy number.
Keywords
: Fuzzy differential equations with piecewise constant argument,α-Level, Fuzzy number, Seikkala derivative.
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