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高校应用数学学报
高校应用数学学报  2015, Vol. 30 Issue (2): 180-190    
    
一类$p$-Laplacian型Neumann边值问题非平凡解的存在性及迭代算法研究
魏利, 陈蕊
河北经贸大学 数学与统计学学院, 河北石家庄 050061
Study on the existence of non-trivial solution of one kind $p$-Laplacian-like Neumann boundary value problems and iterative schemes
WEI Li, CHEN Rui
School of Mathematics and Statistics, Hebei University of Economics and Business, Shijiazhuang 050061, China
 全文: PDF 
摘要: 首先将一类$p$-Laplacian型Neumann边值问题转化为含有极大单调算子的算子方程的形式, 得到算子方程解的存在性结论, 进而证明$p$-Laplacian型Neumann边值问题有非平凡解; 其次, 借助于极大单调算子的相对预解式构造出强收敛到极大单调算子零点的迭代序列; 最后, 建立$p$-Laplacian型Neumann边值问题的解与极大单调算子零点的关系, 得到解的迭代逼近序列. 推广和补充了以往的相关研究成果.
关键词: $p$-Laplacian型边值问题相对预解式非平凡解极大单调算子迭代算法    
Abstract: In the paper, one kind $p$-Laplacian-like equations with Neumann boundaries are first converted to the form of operator equation involving the maximal monotone operators. After being proved that the operator equation exists solution, the $p$-Laplacian-like equations with Neumann boundaries are shown to have non-trivial solution. Secondly, some iterative schemes are constructed to approximate strongly to the zeros of maximal monotone operators through the relative resolvent of the maximal monotone operators. Finally, the relation between the solution of $p$-Laplacian-like equations with Neumann boundaries and the zeros of maximal monotone operators is being set up and then the iterative approximate solution of the $p$-Laplacian-like equations is obtained. The work done in this paper extends and complements some previous corresponding work.
Key words: $p$-Laplacian-like boundary value problems    relative resolvent    non-trivial solution    maximal monotone operator    iterative scheme
收稿日期: 2014-11-18 出版日期: 2018-06-05
CLC:  O177.91  
基金资助: 国家自然科学基金(11071053); 河北省自然科学基金(A2014207010); 河北省教育厅科研重点项目(ZH2012080); 河北经贸大学科研重点项目(2013KYZ01)
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引用本文:

魏利, 陈蕊. 一类$p$-Laplacian型Neumann边值问题非平凡解的存在性及迭代算法研究[J]. 高校应用数学学报, 2015, 30(2): 180-190.

WEI Li, CHEN Rui. Study on the existence of non-trivial solution of one kind $p$-Laplacian-like Neumann boundary value problems and iterative schemes. Applied Mathematics A Journal of Chinese Universities, 2015, 30(2): 180-190.

链接本文:

http://www.zjujournals.com/amjcua/CN/        http://www.zjujournals.com/amjcua/CN/Y2015/V30/I2/180

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