各向异性泛函与各向异性方程解的局部有界性

数学物理学报 ›› 2010, Vol. 30 ›› Issue (2): 425-431.

各向异性泛函与各向异性方程解的局部有界性

高红亚^1,2, 王红敏¹, 褚玉明³

1.河北大学数学与计算机学院, 河北保定 071002|2.河北省数学研究中心, 石家庄 050016|3. |湖州师范学院理学院, 浙江湖州 |313000

收稿日期:2007-12-07 修回日期:2008-09-29 出版日期:2010-04-25 发布日期:2010-04-25
基金资助:
高红亚获河北省自然科学基金数学研究专项(07M003)资助; 褚玉明获973前期研究专项(2006708304), 国家自然科学基金(10771195)和浙江省自然科学基金(Y607128)资助.

Local Boundedness Results Related to Anisotropic Functionals and Anisotropic Equations

GAO Hong-YA^1,2, WANG Hong-Min¹, CHU Yu-Ming³

1.College of Mathematics and Computer Science, Hebei University, Hebei Baoding 071002;
2.Hebei Privincial Center of Mathematics, Shijiazhuang 050016;
3.Faculty of Science, Huzhou Teachers College, Zhejiang Huzhou 313000

Received:2007-12-07 Revised:2008-09-29 Online:2010-04-25 Published:2010-04-25
Supported by:
高红亚获河北省自然科学基金数学研究专项(07M003)资助; 褚玉明获973前期研究专项(2006708304), 国家自然科学基金(10771195)和浙江省自然科学基金(Y607128)资助.

摘要/Abstract

摘要：

证明了各向异性泛函
I(u; Ω) = ∫_Ω f(x, u, Du)dx, u ∈ W_loc^1,(q_i)(Ω)
的极小点与各向异性方程
div A(x, u, Du) =0, u ∈ W_loc^1,(q_i)(Ω)
弱解的局部有界性, 这可认为是经典结果的推广.

关键词: 局部有界性, 各向异性泛函, 各向异性方程

Abstract:

Local boundedness results for minima of the anisotropic functional
I(u; Ω) = ∫_Ω f(x, u, Du)dx, u ∈ W_loc^1,(q_i)(Ω)，
and weak solutions of the anisotropic equation
div A(x, u, Du) =0, u ∈ W_loc^1,(q_i)(Ω)
are proved, which can be regarded as generalizations of the classical results.

Key words: Local boundedness, Anisotropic functional, Anisotropic equation

中图分类号:

35J50

高红亚, 王红敏, 褚玉明. 各向异性泛函与各向异性方程解的局部有界性[J]. 数学物理学报, 2010, 30(2): 425-431.

GAO Hong-YA, WANG Hong-Min, CHU Yu-Ming. Local Boundedness Results Related to Anisotropic Functionals and Anisotropic Equations[J]. Acta mathematica scientia,Series A, 2010, 30(2): 425-431.