A Variational Approach for One-Dimensional Scalar Field Problems

被引:1
|
作者
Hadjian, Armin [1 ]
机构
[1] Univ Bojnord, Fac Basic Sci, Dept Math, POB 1339, Bojnord 94531, Iran
来源
INDIAN JOURNAL OF PURE & APPLIED MATHEMATICS | 2018年 / 49卷 / 04期
关键词
One-dimensional scalar field problem; variational methods; infinitely many solutions; EQUATIONS;
D O I
10.1007/s13226-018-0290-7
中图分类号
O1 [数学];
学科分类号
0701 ; 070101 ;
摘要
In this paper, we are interested in the existence of infinitely many weak solutions for a onedimensional scalar field problem. By using variational methods, in an appropriate functional space which involves the potential V, we determine intervals of parameters such that our problem admits either a sequence of weak solutions strongly converging to zero provided that the nonlinearity has a suitable behavior at zero or an unbounded sequence of weak solutions if a similar behavior occurs at infinity.
引用
收藏
页码:621 / 632
页数:12
相关论文
共 50 条
  • [41] Boundary element method formulations for the solution of the scalar wave equation in one-dimensional problems
    J. A. M. Carrer
    V. L. Costa
    Journal of the Brazilian Society of Mechanical Sciences and Engineering, 2015, 37 : 959 - 971
  • [42] A variational theory for one-dimensional unsteady compressible flow - an image plane approach
    He, JH
    APPLIED MATHEMATICAL MODELLING, 1998, 22 (06) : 395 - 403
  • [43] A NON-GAUSSIAN VARIATIONAL APPROACH TO THE ONE-DIMENSIONAL ANHARMONIC-OSCILLATOR
    CASTORINA, P
    CONSOLI, M
    ZAPPALA, D
    NUOVO CIMENTO DELLA SOCIETA ITALIANA DI FISICA B-GENERAL PHYSICS RELATIVITY ASTRONOMY AND MATHEMATICAL PHYSICS AND METHODS, 1987, 100 (06): : 751 - 755
  • [44] Variational approach to one-dimensional electrons non-adiabatically coupled to phonons
    Pang, XF
    CHINESE PHYSICS LETTERS, 1999, 16 (02): : 129 - 131
  • [45] A ONE-DIMENSIONAL VARIATIONAL FORMULATION FOR QUASIBRITTLE FRACTURE
    Comi, Claudia
    Mariani, Stefano
    Negri, Matteo
    Perego, Umberto
    JOURNAL OF MECHANICS OF MATERIALS AND STRUCTURES, 2006, 1 (08) : 1323 - 1343
  • [46] A VARIATIONAL FORMULATION FOR ONE-DIMENSIONAL LINEAR THERMOVISCOELASTICITY
    Giorgio, Ivan
    MATHEMATICS AND MECHANICS OF COMPLEX SYSTEMS, 2021, 9 (04) : 397 - 412
  • [47] A VARIATIONAL PRINCIPLE FOR A ONE-DIMENSIONAL STELLAR SYSTEM
    HOHL, F
    FEIX, MR
    ASTROPHYSICAL JOURNAL, 1968, 151 (2P1): : 783 - &
  • [48] VARIATIONAL PRINCIPLE FOR ONE-DIMENSIONAL INVISCID FLOW
    Liu, Xian-Yong
    Liu, Yan-Ping
    Wu, Zeng-Wen
    THERMAL SCIENCE, 2022, 26 (03): : 2465 - 2469
  • [49] Variational model for one-dimensional quantum magnets
    Kudasov, Yu. B.
    Kozabaranov, R. V.
    PHYSICS LETTERS A, 2018, 382 (16) : 1120 - 1123
  • [50] MINIMIZERS OF ONE-DIMENSIONAL PARAMETRIC VARIATIONAL INTEGRALS
    Hildebrandt, S.
    ST PETERSBURG MATHEMATICAL JOURNAL, 2016, 27 (03) : 569 - 576
12345