Existence of solution for Schrodinger equation with discontinuous nonlinearity and asymptotically linear

被引:6
作者
Alves, Claudianor O. [1 ]
Patricio, Geovany F. [1 ]
机构
[1] Univ Fed Campina Grande, Unidade Acad Matemat, BR-58429970 Campina Grande, Paraiba, Brazil
来源
JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS | 2022年 / 505卷 / 02期
关键词
Elliptic problem; Variational methods; Discontinuous nonlinearity; Asymptotically linear; MULTIPLE SOLUTIONS; DIFFERENTIAL-EQUATIONS; ELLIPTIC EQUATION; POSITIVE SOLUTION;
D O I
10.1016/j.jmaa.2021.125640
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
This paper concerns the existence of a nontrivial solution for the following problem {-Delta u + V(x)u is an element of partial derivative F-u(x,u) a.e in R-N, (P) u is an element of H-1 (R-N), where F(x, t) = integral(t)(0) f(x, s) ds, f is a mensurable function and asymptotically linear at infinity, lambda = 0 is in a spectral gap of -Delta + V, and partial derivative F-t denotes the generalized gradient of F with respect to variable t. Here, by employing Variational Methods for Locally Lipschitz Functionals, we establish the existence of solution when f is periodic and non periodic. (C) 2021 Elsevier Inc. All rights reserved.
引用
收藏
页数:27
相关论文
共 35 条
[1]   ON MULTIBUMP BOUND-STATES FOR CERTAIN SEMILINEAR ELLIPTIC-EQUATIONS [J].
ALAMA, S ;
LI, YY .
INDIANA UNIVERSITY MATHEMATICS JOURNAL, 1992, 41 (04) :983-1026
[2]  
Alves C.O., ARXIV201203641V1MATH
[3]   THE OBSTACLE PROBLEM AND PARTIAL-DIFFERENTIAL EQUATIONS WITH DISCONTINUOUS NONLINEARITIES [J].
CHANG, KC .
COMMUNICATIONS ON PURE AND APPLIED MATHEMATICS, 1980, 33 (02) :117-146
[4]  
CHANG KC, 1978, SCI SINICA, V21, P139
[5]   VARIATIONAL-METHODS FOR NON-DIFFERENTIABLE FUNCTIONALS AND THEIR APPLICATIONS TO PARTIAL-DIFFERENTIAL EQUATIONS [J].
CHANG, KC .
JOURNAL OF MATHEMATICAL ANALYSIS AND APPLICATIONS, 1981, 80 (01) :102-129
[6]   Ground state solutions of asymptotically linear fractional Schrodinger equations [J].
Chang, Xiaojun .
JOURNAL OF MATHEMATICAL PHYSICS, 2013, 54 (06)
[7]   Existence of nontrivial solutions for asymptotically linear periodic Schrodinger equations [J].
Chen, Shaowei ;
Zhang, Dawei .
COMPLEX VARIABLES AND ELLIPTIC EQUATIONS, 2015, 60 (02) :252-267
[8]   A positive bound state for an asymptotically linear or superlinear Schrodinger equation [J].
Clapp, Monica ;
Maia, Liliane A. .
JOURNAL OF DIFFERENTIAL EQUATIONS, 2016, 260 (04) :3173-3192
[9]  
Clark F.H., 1983, Optimization and Nonsmooth Analysis
[10]   GENERALIZED GRADIENTS AND APPLICATIONS [J].
CLARKE, FH .
TRANSACTIONS OF THE AMERICAN MATHEMATICAL SOCIETY, 1975, 205 (APR) :247-262
1234