Nontrivial Solution for the Fractional p-Laplacian Equations via Perturbation Methods

Nontrivial Solution for the Fractional p-Laplacian Equations via Perturbation Methods

We study the existence of nontrivial solution of the following equation without compactness: (-Δ)pαu+up-2u=f(x,u),  x∈RN, where N,p≥2,  α∈(0,1),  (-Δ)pα is the fractional p-Laplacian, and the subcritical p-superlinear term f∈C(RN×R) is 1-periodic in xi for i=1,2,…,N. Our main difficulty is that the...

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Main Authors: Huxiao Luo, Shengjun Li, Xianhua Tang
Format: Article
Language:English
Published: Hindawi Limited 2017-01-01
Series:Advances in Mathematical Physics
Online Access:http://dx.doi.org/10.1155/2017/5317213
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spelling doaj-b267501f406e48418e85292d141bee7e2021-07-02T10:27:39ZengHindawi LimitedAdvances in Mathematical Physics1687-91201687-91392017-01-01201710.1155/2017/53172135317213Nontrivial Solution for the Fractional p-Laplacian Equations via Perturbation MethodsHuxiao Luo0Shengjun Li1Xianhua Tang2School of Mathematics and Statistics, Central South University, Changsha, Hunan 410083, ChinaSchool of Mathematics and Statistics, Central South University, Changsha, Hunan 410083, ChinaSchool of Mathematics and Statistics, Central South University, Changsha, Hunan 410083, ChinaWe study the existence of nontrivial solution of the following equation without compactness: (-Δ)pαu+up-2u=f(x,u),  x∈RN, where N,p≥2,  α∈(0,1),  (-Δ)pα is the fractional p-Laplacian, and the subcritical p-superlinear term f∈C(RN×R) is 1-periodic in xi for i=1,2,…,N. Our main difficulty is that the weak limit of (PS) sequence is not always the weak solution of fractional p-Laplacian type equation. To overcome this difficulty, by adding coercive potential term and using mountain pass theorem, we get the weak solution uλ of perturbation equations. And we prove that uλ→u as λ→0. Finally, by using vanishing lemma and periodic condition, we get that u is a nontrivial solution of fractional p-Laplacian equation.http://dx.doi.org/10.1155/2017/5317213
collection DOAJ
language English
format Article
sources DOAJ
author Huxiao Luo
Shengjun Li
Xianhua Tang
spellingShingle Huxiao Luo
Shengjun Li
Xianhua Tang
Nontrivial Solution for the Fractional p-Laplacian Equations via Perturbation Methods
Advances in Mathematical Physics
author_facet Huxiao Luo
Shengjun Li
Xianhua Tang
author_sort Huxiao Luo
title Nontrivial Solution for the Fractional p-Laplacian Equations via Perturbation Methods
title_short Nontrivial Solution for the Fractional p-Laplacian Equations via Perturbation Methods
title_full Nontrivial Solution for the Fractional p-Laplacian Equations via Perturbation Methods
title_fullStr Nontrivial Solution for the Fractional p-Laplacian Equations via Perturbation Methods
title_full_unstemmed Nontrivial Solution for the Fractional p-Laplacian Equations via Perturbation Methods
title_sort nontrivial solution for the fractional p-laplacian equations via perturbation methods
publisher Hindawi Limited
series Advances in Mathematical Physics
issn 1687-9120
1687-9139
publishDate 2017-01-01
description We study the existence of nontrivial solution of the following equation without compactness: (-Δ)pαu+up-2u=f(x,u),  x∈RN, where N,p≥2,  α∈(0,1),  (-Δ)pα is the fractional p-Laplacian, and the subcritical p-superlinear term f∈C(RN×R) is 1-periodic in xi for i=1,2,…,N. Our main difficulty is that the weak limit of (PS) sequence is not always the weak solution of fractional p-Laplacian type equation. To overcome this difficulty, by adding coercive potential term and using mountain pass theorem, we get the weak solution uλ of perturbation equations. And we prove that uλ→u as λ→0. Finally, by using vanishing lemma and periodic condition, we get that u is a nontrivial solution of fractional p-Laplacian equation.
url http://dx.doi.org/10.1155/2017/5317213
work_keys_str_mv AT huxiaoluo nontrivialsolutionforthefractionalplaplacianequationsviaperturbationmethods
AT shengjunli nontrivialsolutionforthefractionalplaplacianequationsviaperturbationmethods
AT xianhuatang nontrivialsolutionforthefractionalplaplacianequationsviaperturbationmethods
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