Existence of ground state sign-changing solutions for a class of generalized quasilinear Schrodinger-Maxwell system in R3

被引：6

作者：

Chen, Jianhua ^{[1
]}

Tang, Xianhua ^{[1
]}

Cheng, Bitao ^{[1
,2
]}

机构：

[1] Cent S Univ, Sch Math & Stat, Changsha 410083, Hunan, Peoples R China

[2] Qujing Normal Univ, Sch Math & Stat, Qujing 655011, Yunnan, Peoples R China

来源：

COMPUTERS & MATHEMATICS WITH APPLICATIONS | 2017年 / 74卷 / 03期

基金：

中国国家自然科学基金;

关键词：

Generalized quasilinear; Schrodinger-Maxwell system; Ground state sign-changing solutions; Non-Nehari manifold method; NEHARI-MANIFOLD METHOD; SOLITON-SOLUTIONS; ELLIPTIC-EQUATIONS; BOUNDED DOMAINS; INFINITY;

D O I：

10.1016/j.camwa.2017.04.028

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

In this paper, we study the existence of ground state sign-changing solutions for the following generalized quasilinear Schrodinger-Maxwell system {-div(g(2)(u)del u) + g(u)g'(u)vertical bar del u(2)vertical bar + V(x)u + mu phi G(u)g(u)=K(x)f(u), x is an element of R-3, -Delta phi= G(2)(u), x is an element of R-3, where g is an element of C-1 (R, R+), V(x) and K(x) are positive continuous functions and mu is a positive parameter. By making a change of variable as u = G(-1)(v) and G(u) = integral(u)(0) g(t)dt, we obtain one ground state sign-changing solution v mu = G(-1)(u(mu)) by using some new analytical skills and non-Nehari manifold method. Furthermore, the energy of v(mu) = G(-1)(u(mu)) is strictly larger than twice that of the ground state solutions of Nehari-type. We also establish the convergence property of v(mu) = G(-1)(u(mu)) as the parameter mu SE arrow 0. Our results improve and generalize some results obtained by Chen and Tang (2016), Zhu et al. (2016). (C) 2017 Elsevier Ltd. All rights reserved.

引用

页码：466 / 481

页数：16

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