Analytic solutions of the Weiss mean field equation

被引:2
|
作者
Koksharov, Yu A. [1 ,2 ]
机构
[1] Moscow MV Lomonosov State Univ, Fac Phys, Moscow 119991, Russia
[2] Kotelnikov Inst Radioengn & Elect RAN, Moscow 125009, Russia
来源
JOURNAL OF MAGNETISM AND MAGNETIC MATERIALS | 2020年 / 516卷
基金
俄罗斯基础研究基金会;
关键词
Weiss mean-field equation; Langevin function; Analytical solutions; Magnetization; Switching field; INVERSE LANGEVIN; ACCURATE APPROXIMANTS; MODEL;
D O I
10.1016/j.jmmm.2020.167179
中图分类号
T [工业技术];
学科分类号
08 ;
摘要
Analytic solutions of the Weiss mean field equation are obtained using an approximant of the inverse Langevin function. These solutions provide temperature dependencies of the magnetization and the magnetic susceptibility typical of the classical Weiss mean field model. It is interesting that the approximate cubic equation, studied in the work, is very close to that derived by the differentiation of the exact Weiss mean field equation. These equations coincide in the low temperature limit.
引用
收藏
页数:4
相关论文
共 50 条
  • [41] Analytic Solutions of a Functional Equation Proposal
    Janous, Walther
    AMERICAN MATHEMATICAL MONTHLY, 2023, 130 (08): : 774 - 774
  • [42] Analytic solutions of the Teukolsky equation and their properties
    Mano, S
    Takasugi, E
    PROGRESS OF THEORETICAL PHYSICS, 1997, 97 (02): : 213 - 232
  • [43] APPROXIMATE ANALYTIC SOLUTIONS TO THE SKYRME EQUATION
    LINDE, J
    SNELLMAN, H
    JOURNAL OF MATHEMATICAL PHYSICS, 1992, 33 (11) : 3740 - 3745
  • [44] On the existence and blow-up of solutions for a mean field equation with variable intensities
    Ricciardi, Tonia
    Takahashi, Ryo
    Zecca, Gabriella
    Zhang, Xiao
    RENDICONTI LINCEI-MATEMATICA E APPLICAZIONI, 2016, 27 (04) : 413 - 429
  • [45] Multiple Non-Axially Solutions to a Mean Field Equation on S~2
    Zhuoran Du
    Changfeng Gui
    Jiaming Jin
    Yuan Li
    AnalysisinTheoryandApplications, 2020, 36 (01) : 19 - 32
  • [46] On the mean field type bubbling solutions for Chern-Simons-Higgs equation
    Lin, Chang-Shou
    Yan, Shusen
    ADVANCES IN MATHEMATICS, 2018, 338 : 1141 - 1188
  • [47] BELLMAN EQUATION AND VISCOSITY SOLUTIONS FOR MEAN-FIELD STOCHASTIC CONTROL PROBLEM
    Huyen Pham
    Wei, Xiaoli
    ESAIM-CONTROL OPTIMISATION AND CALCULUS OF VARIATIONS, 2018, 24 (01) : 437 - 461
  • [48] Multiple Axially Asymmetric Solutions to a Mean Field Equation on S2
    Du, Zhuoran
    Gui, Changfeng
    Jin, Jiaming
    Li, Yuan
    ANALYSIS IN THEORY AND APPLICATIONS, 2020, 36 (01) : 19 - 32
  • [49] ON THE ANALYTIC SOLUTIONS OF A VECTOR FIELD
    SEBASTIANI, M
    COMPTES RENDUS DE L ACADEMIE DES SCIENCES SERIE I-MATHEMATIQUE, 1993, 316 (12): : 1281 - 1282
  • [50] SOME PROPERTIES OF ASYMPTOTIC SOLUTIONS OF MONTROLL-WEISS EQUATION
    TUNALEY, JKE
    JOURNAL OF STATISTICAL PHYSICS, 1975, 12 (01) : 1 - 10
12345