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【数学与应用数学系系列讲座第11场】


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戴睿:On the structural stability for two-point boundary value problems of undamped fuzzy differential equations


报告题目: On the structural stability for two-point boundary value problems of undamped fuzzy differential equations


报告人:戴睿 讲师 4556银河国际在线


报告时间:528号下午1600-1640


报告地点:腾讯会议 ID358 7897 9396


报告人简介:戴睿,4556银河国际在线讲师,2019年博士毕业于哈尔滨工业大学。研究领域为模糊微分方程,参与在研国家自然科学基金两项,多篇论文发表在SCI学术期刊《Fuzzy Sets and Systems》上。



报告摘要:


In this lecture, we will introduce the study of the structural stability for two-point boundary value problems of second order fuzzy differential equations (FDEs) by using differential inclusion method. In the sense of differential inclusion, this FDE understood as a two-point boundary value problem of uncertain dynamical system which exist a unique big solution and a unique solution. When the forcing function or boundary conditions have specific perturbations, the structural stability of big solutions are discussed by means of Green function. After that, by using tools of support function, the Dini Theorem and the Convergence Theorem in the differential inclusion theory, the structural stability of solutions has been discussed and established too.



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