Existence and stability for fractional parabolic integro-partial differential equations with fractional Brownian motion and nonlocal condition

IF 0.1 Q4 MATHEMATICS Cogent mathematics & statistics Pub Date : 2018-01-01 DOI:10.1080/25742558.2018.1460030
M. El-Borai, K. El-Nadi, H. Ahmed, H. El-Owaidy, A. Ghanem, R. Sakthivel
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引用次数: 15

Abstract

In this paper, a nonlinear fractional parabolic stochastic integro-partial differential equations with nonlocal effects driven by a fractional Brownian motion is considered. In particular, first we have formulated the suitable solution form for the fractional partial differential equations with nonlocal effects driven by fractional Brownian motion using a parabolic transform. Next, the existence and uniqueness of solutions are obtained for the fractional stochastic partial differential equations without any restrictions on the characteristic forms when the Hurst parameter of the fractional Brownian motion is less than half. Further, we investigate the stability of the solution for the considered problem. The required result is established by means of standard Picard’s iteration.
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具有分数布朗运动和非局部条件的分数抛物型积分偏微分方程的存在性和稳定性
研究了一类由分数阶布朗运动驱动的具有非局部效应的非线性分数阶抛物型随机积分偏微分方程。特别地,我们首先用抛物变换给出了分数阶布朗运动驱动的非局域效应分数阶偏微分方程的合适解形式。其次,得到了分数阶布朗运动的Hurst参数小于一半时,不受特征形式限制的分数阶随机偏微分方程解的存在唯一性。进一步,我们研究了所考虑问题的解的稳定性。采用标准皮卡德迭代法建立了所需结果。
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