分数阶微分方程弱拓扑下新的存在性结果

Hallaci Ahmed, Professor DR., Krichen Bi̇lel, Mefteh Bi̇lel
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引用次数: 0

摘要

讨论了一类含有riemann - liouville型分数阶导数的初值问题弱解的存在性。为此,我们将所提问题转化为两个积分算子的和,然后应用弱拓扑下Krasnoselskii不动点定理的一个变体,得出了弱解的存在性。
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New existence result under weak topology for fractional differential equations
This paper deals with the existence of weak solutions for an initial value problem involving Riemann-Liouville-type fractional derivatives. To this end, we transform the posed problem to a sum of two integral operators, then we apply a variant of Krasnoselskii’s fixed point theorem under weak topology to conclude the existence of weak solutions.
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