| Projective Dirichlet Boundary Condition with Applications to a Geometric Problem |
| Ji, Min
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| 2016
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发表期刊 | ACTA MATHEMATICA SINICA-ENGLISH SERIES
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ISSN | 1439-8516
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卷号 | 32期号:1页码:11-24 |
摘要 | Given a domain Omega subset of R-n, let lambda > 0 be an eigenvalue of the elliptic operator L := Sigma(n)(i,j=1) partial derivative/partial derivative x(i) (a(ij) partial derivative/partial derivative x(j)) on Omega for Dirichlet condition. For a function f is an element of L-2 (Omega), it is known that the linear resonance equation Lu + lambda u - f in Omega with Dirichlet boundary condition is not always solvable. We give a new boundary condition P-lambda(u vertical bar partial derivative Omega) = g, called to be projective Dirichlet condition, such that the linear resonance equation always admits a unique solution u being orthogonal to all of the eigenfunctions corresponding to lambda which satisfies parallel to u parallel to(2,2) <= C(parallel to f parallel to(2) + parallel to g parallel to(2,2)) under suitable regularity assumptions on partial derivative Omega and L, where C is a constant depends only on n, Omega, and L. More a priori estimates, such as W-2,W-p-estimates and the C-2,C-alpha-estimates etc., are given also. This boundary condition can be viewed as a generalization of the Dirichlet condition to resonance equations and shows its advantage when applying to nonlinear resonance equations. In particular, this enables us to find the new indicatrices with vanishing mean (Cartan) torsion in Minkowski geometry. It is known that the geometry of indicatries is the foundation of Finsler geometry. |
关键词 | Elliptic resonance equation
nonlinear boundary condition
convex indicatrix
mean torsion
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DOI | 10.1007/s10114-015-4575-z
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语种 | 英语
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资助项目 | NSFC Innovation Grant[10421101]
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WOS研究方向 | Mathematics
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WOS类目 | Mathematics, Applied
; Mathematics
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WOS记录号 | WOS:000365803900002
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出版者 | SPRINGER HEIDELBERG
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引用统计 |
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文献类型 | 期刊论文
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条目标识符 | http://ir.amss.ac.cn/handle/2S8OKBNM/21367
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专题 | 数学所
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通讯作者 | Ji, Min |
作者单位 | Chinese Acad Sci, Acad Math & Syst Sci, Beijing 100190, Peoples R China
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推荐引用方式 GB/T 7714 |
Ji, Min. Projective Dirichlet Boundary Condition with Applications to a Geometric Problem[J]. ACTA MATHEMATICA SINICA-ENGLISH SERIES,2016,32(1):11-24.
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APA |
Ji, Min.(2016).Projective Dirichlet Boundary Condition with Applications to a Geometric Problem.ACTA MATHEMATICA SINICA-ENGLISH SERIES,32(1),11-24.
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MLA |
Ji, Min."Projective Dirichlet Boundary Condition with Applications to a Geometric Problem".ACTA MATHEMATICA SINICA-ENGLISH SERIES 32.1(2016):11-24.
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