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【答案】应助回帖
★ ★ ★ ★ ★
感谢参与,应助指数 +1
zhouhui0309(lazy锦溪代发): 金币+5, 协助结帖,感谢应助! 2015-12-01 09:00:31
lazy锦溪: LS-EPI+1, 感谢应助! 2015-12-01 09:00:36
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20154601557562
Articles not published yet, but available online Article in Press Information about Article in Press
Title: Solvability for fractional p-Laplacian differential equations with multipoint boundary conditions at resonance on infinite interval
Authors: Zhou, Hui1 Email author zhouhui0309@126.com; Yang, Liu1; Agarwal, Praveen2
Author affiliation: 1 School of Mathematics and Statistics, Hefei Normal University, Hefei, China
2 Department of Mathematics, Anand International College of Engineering, Jaipur, India
Corresponding author: Zhou, Hui
Source title: Journal of Applied Mathematics and Computing
Abbreviated source title: J. Appl. Math. Comp.
Issue date: November 12, 2015
Publication year: 2015
Language: English
ISSN: 15985865
Document type: Article in Press
Publisher: Springer Verlag
Abstract: This paper is concerned with the existence of solutions for fractional p-Laplacian differential equation with multipoint boundary conditions at resonance on an infinite interval. Under an appropriate compactness criterion, we make use the coincidence degree theory to establish the existence of solutions to the above-mentioned equation. An example is given to illustrate the obtained result. © 2015 Korean Society for Computational and Applied Mathematics
Page count: 26
Main heading: Boundary conditions
Controlled terms: Differential equations - Laplace transforms
Uncontrolled terms: Coincidence degree - Coincidence degree theory - Compactness criterion - Existence of Solutions - Fractional differential equations - Multi-point boundary conditions - P-Laplacian - p-Laplacian differential equation
Classification code: 921.2 Calculus - 921.3 Mathematical Transformations
DOI: 10.1007/s12190-015-0957-8
Database: Compendex
Compilation and indexing terms, © 2015 Elsevier Inc. |
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