J4 ›› 2009, Vol. 47 ›› Issue (4): 695-700.

• 数学 • 上一篇    下一篇

高维情形下铁磁与反铁磁泛函可正则化极小元的C 1,α收敛性

郑亚芹1, 占德胜2   

  1. 1. 南京师范大学 数学研究所, 南京 210097|2. 马鞍山职业技术学院, 安徽 马鞍山 243031
  • 收稿日期:2008-09-19 出版日期:2009-07-26 发布日期:2009-08-24
  • 通讯作者: 郑亚芹 E-mail:yaqinok@126.com.

C1,α Convergence of the Regularized Minimizer of Ferromagneticand Antiferromagnetic Functional in Higher Dimensions

ZHENG Yaqin1, ZHAN Desheng2   

  1. 1. Institute of Mathematics, Nanjing Normal University, Nanjing 210097, China;2. Ma’anshan Technology College, Ma’anshan 243031, Anhui Province, China
  • Received:2008-09-19 Online:2009-07-26 Published:2009-08-24
  • Contact: ZHENG Yaqin E-mail:yaqinok@126.com.

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摘要:

研究一类与铁磁和反铁磁相关的泛函模型, 其中p∈(n-1,n), n≥3. 利用局部分析技巧, 讨论了这类泛函的正则性估计, 证明了泛函可正则化极小元的W1,ploc收敛性, 并利用Euler方程解的正则性估计, 得到此泛函径向极小元的C1,α收敛性及收敛速度的估计.

关键词: 铁磁与反铁磁泛函, 可正则化极小元, 收敛速度的估计

Abstract:

In this paper is  concerned with a ferromagnetic and antiferromagnetic functional in the case of p∈(n-1,n), n≥3. Applying the local analysis, the authors firstly deduced the regular estimate of this functional. Then the W1,ploc convergence of its regularized minimizer was proved. Based on these results and the established  corresponding estimate of the radial solution to the Euler system, the authors finally obtained the C1,α  convergence and the estimate of the convergence rate of the radial minimizer.

Key words: ferromagnetic and antiferromagnetic functional, regularized minimizer, estimate of the convergence rate

中图分类号: 

  • O175.2
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