全部 标题 作者
关键词 摘要

OALib Journal期刊
ISSN: 2333-9721
费用:99美元
投递稿件

查看量下载量

相关文章

更多...
-  2016 

含参数及p-Laplacian算子的奇异分数阶微分方程积分边值问题的正解
Positive solutions for some singular fractional differential equation integral boundary value problems with p-Laplacian and a parameter

DOI: 10.6040/j.issn.1671-9352.0.2015.632

Keywords: 奇异性,p-Laplacian算子,分数阶微分方程,高度函数,
fractional differential equation,singularity,p-Laplacian,height functions

Full-Text   Cite this paper   Add to My Lib

Abstract:

摘要: 利用Green函数的性质构造出合适的锥,引入适当的高度函数并考虑高度函数在锥中某些有界集合上的积分,研究一类具有p-Laplacian算子的非线性奇异分数阶微分方程积分边值问题的局部正解以及多个局部正解。非线性项f允许关于时间和空间变量具有奇异性。
Abstract: A special cone is constructed by means of the properties of Green function. By introducing height functions of the nonlinear term on some bounded sets and considering integrations of these height functions, several existence and multiplicity of local positive solutions theorems for some nonlinear fractional differential equation integral boundary value problems with p-Laplacian and a parameter are obtained. The nonlinear term f permits singularities with respect to both the time and space variables

 References

[1]  SAMKO S G, KILBAS A A, MARICHEV O I. Fractional integral and derivative, in: theory and applications[M]. Switzerland: Gordon and Breach Science Publishers, 1993.
[2]  ZHANG Xingqiu. Positive solutions for a class of singular fractional differential equation with infinite-point boundary value conditions[J]. Appl Math Lett, 2015, 39:22-27.
[3]  郭柏灵, 蒲学科, 黄凤辉. 分数阶偏微分方程及其数值解[M]. 北京: 科学出版社, 2011. GUO Boling, PU Xueke, HUANG Fenghui. Fractional partial differential equations and their numerical solutions[M]. Beijing: Science Press, 2011.
[4]  AHMAD B, NTOUYAS S K. Existence results for a coupled system of Caputo type sequential fractional differential equations with nonlocal integral boundary conditions[J]. Appl Math Comput, 2015, 266:615-622.
[5]  JIA Mei, LIU Xiping. Three nonnegative solutions for fractional differential equations with integral boundary conditions[J]. Comput Math Appl, 2011, 62:1405-1412.
[6]  HAN Zhenlai, LU Hongling, ZHANG Chao. Positive solutions for eigenvalue problems of fractional differential equation with generalized <i>p</i>-Laplacian[J]. Appl Math Comput, 2015, 257:526-536.
[7]  GUO Dajun, LAKSHMIKANTHAM V. Nonlinear problems in abstract cones[M]. San Diego: Academic Press, 1988.
[8]  ZHANG Xingqiu. Positive solutions for singular higher-order fractional differential equations with nonlocal conditions[J]. J Appl Math Comput, 2015, 49:69-89.
[9]  ZHANG Xingqiu, WANG Lin, SUN Qian. Existence of positive solutions for a class of nonlinear fractional differential equations with integral boundary conditions and a parameter[J]. Appl Math Comput, 2014, 226:708-718.
[10]  JIANG Weihua. Solvability of fractional differential equations with <i>p</i>-Laplacian at resonance[J]. Appl Math Comput, 2015, 260:48-56.
[11]  YAO Qingliu. Positive solutions of nonlinear beam equations with time and space singularities[J]. J Math Anal Appl, 2011, 374:681-692.
[12]  HENDERSON J, LUCA R. Positive solutions for a system of fractional differential equations with coupled integral boundary conditions[J]. Appl Math Comput, 2014, 249:182-197.
[13]  WANG Yongqing, LIU Lishan, WU Yonghong. Positive solutions for a nonlocal fractional differential equation[J]. Nonlinear Anal, 2011, 74:3599-3605.
[14]  PODLUBNY I. Fractional differential equations, mathematics in science and engineering[M]. San Diego: Academic Press, 1999.
[15]  WANG Guotao. Explicit iteration and unbounded solutions for fractional integral boundary value problem on an infinite interval[J]. Appl Math Lett, 2015, 47:1-7.
[16]  YAO Qingliu. Local existence of multiple positive solutions to a singular cantilever beam equation[J]. J Math Anal Appl, 2010, 363:138-154.

Full-Text

Contact Us

service@oalib.com

QQ:3279437679

WhatsApp +8615387084133