期刊文献+
任意字段
题名或关键词
题名
关键词
文摘
作者
第一作者
机构
刊名
分类号
参考文献
作者简介
基金资助
栏目信息

具有π-导数模糊微分方程的近似解

Approximate solutions of fuzzy differential equation under π-differentiability
下载PDF
导出
摘要 在模糊值函数具有π-导数意义下研究一阶模糊微分方程的模糊初值问题,将模糊微分方程转化成同解的常微分方程,利用变分迭代算法给出方程的近似解,给出了具体算例。 The first order fuzzy differential equations with initial value problem is studied by using the π-differentia-bility concept, and the fuzzy differential equations will be translated into two ordinary differential equations and the approximate solutions is obtained by variational iteration method. One illustrated example is provided.
作者 王磊 郭嗣琮
机构地区 辽宁工程技术大学基础教学部 辽宁工程技术大学理学院
出处 《计算机工程与应用》 CSCD 2012年第18期1-3,8,共4页 Computer Engineering and Applications
基金 高等学校博士点学科点专项科研基金资助项目(No.20102121110002)
关键词 模糊微分方程 π-导数 变分迭代法 近似解 fuzzy differential equation π-differentiability variational iteration method approximate solutions
分类号 O159 [理学—基础数学]
  • 相关文献

参考文献15

  • 1Wu C X, Song S J.Existence and uniqueness of solu- tions to the Cauehy problem of fuzzy differential equa- tions[J].Fuzzy Sets and Systems,2000,110:55-67.
  • 2Nieto J J, Rodriguez-L6pez R, Franeo D.Linear first-order fuzzy differential equations[J].Intemational Journal of Un- certainty Fuzziness Knowledge-Based Systems,2006,14: 687-709.
  • 3Misukoshi M, Chalco-Cano Y, Roman-Flores H, et al.Fuzzy differential equations and the extension principle[J].Infor- mation Sciences,2007,177: 3627-3635.
  • 4王磊,郭嗣琮.一阶线性模糊微分方程的解[J].模糊系统与数学,2011,25(3):113-118. 被引量:9
  • 5王磊,郭嗣琮.一阶线性模糊微分方程的模糊结构元解法[J].合肥工业大学学报(自然科学版),2011,34(10):1576-1579. 被引量:6
  • 6王磊,郭嗣琮,李娜.具有推广Hukuhara导数的模糊微分方程的数值解[J].计算机工程与应用,2012,48(2):56-58. 被引量:5
  • 7Chang S L,Zadeh L A.On fuzzy mapping and control[J]. IEEE Transactions on Systems, Man and Cybemetics, 1972,2: 330-340.
  • 8Dubois D,Prade H.Towards fuzzy differential calculus: part 3,differentiation[J].Fuzzy Sets and Systems, 1982,8: 225-233.
  • 9Bede B, Gal S G.Generalizations of the differentiability of fuzzy number valued functions with applications to fuzzy differential equations[J].Fuzzy Sets and Systems, 2005,151:581-599.
  • 10Bede B, Rudas I J, Bencsik A L.First order linear fuzzy differential equations under generalized differentiability[J]. Information Sciences,2007,177: 1648-1662.

二级参考文献48

  • 1郭嗣琮,苏志雄,王磊.模糊分析计算中的结构元方法[J].模糊系统与数学,2004,18(3):68-75. 被引量:50
  • 2郭嗣琮,王磊.模糊限定微分方程及定解问题[J].工程数学学报,2005,22(5):869-874. 被引量:10
  • 3郭嗣琮.模糊数与模糊值函数的结构元线性表示[J].辽宁工程技术大学学报(自然科学版),2006,25(3):475-477. 被引量:18
  • 4Chang L S,Zadeh L A. On fuzzy mapping and control[J]. IEEE Trans Systems Man Cybemet, 1972,2: 30- 34.
  • 5Dubois D,Prade H. Towards fuzzy differential calculus., part 3,differentiation[J]. Fuzzy Sets and Systems, 1982,8: 225- 233.
  • 6Kaleva O. Fuzzy differential equati9ns[J]. Fuzzy Sets and Sys- terns, 1987,24: 301-317.
  • 7Song S, Wu C. Existence and uniqueness of solutions to the Cauchy problena of fuzzy differential equations[J]. Fuzzy Sets and Systems, 2000,110: 55- 67.
  • 8Hullermeier E. An approach to modelling and simulation of unsystems[J]. International Journal of Uncertainty Fuzzi- ness Knowledge-Based System, 1997,5 ; 117- 137.
  • 9Guo M, Xue X P, Li R. Impulsive functional differential inclu- sions and fuzzy population models [J]. Fuzzy Sets and Systems, 2003,138: 601- 615.
  • 10Misukoshi M,Chalco-Cano Y,Romdn-Flores H,et aL Fuzzy dii- ferefltial equations and the extension principle[J]. Information Science.s, 2007,177 : 3627- 3635.

共引文献28

计算机工程与应用
2012年 第18期

相关作者

内容加载中请稍等...

相关机构

内容加载中请稍等...

相关主题

内容加载中请稍等...

浏览历史

内容加载中请稍等...
;
使用帮助 返回顶部