In this paper,we study minimal Legendrian surfacesΣimmersed in the tangent sphere bundle T_(1)R^(3).We classify(1)totally geodesic Legendrian surfaces,(2)closed minimal Legendrian surfaces of genus smaller than or eq...In this paper,we study minimal Legendrian surfacesΣimmersed in the tangent sphere bundle T_(1)R^(3).We classify(1)totally geodesic Legendrian surfaces,(2)closed minimal Legendrian surfaces of genus smaller than or equal to 1 and complete minimal Legendrian surfaces with the non-negative Gauss curvature,and(3)complete stable minimal Legendrian surfaces.展开更多
In this paper,we first introduce a boundary problem for Lagrangian submanifolds,analogous to the problem for free boundary hypersurfaces and capillary hypersurfaces.Then we present several interesting examples of Lagr...In this paper,we first introduce a boundary problem for Lagrangian submanifolds,analogous to the problem for free boundary hypersurfaces and capillary hypersurfaces.Then we present several interesting examples of Lagrangian submanifolds satisfying this boundary condition and we prove a Lagrangian version of the Nitsche(or Hopf)type theorem.Some problems are proposed at the end of this paper.展开更多
In this paper, the properties of the maps for the Heisenberg group targets are studied. For u e∈W1,α(Ω, Hm), some Poincare type inequalities are proved. For the energy minimizers, the ∈-regularity theorems and the...In this paper, the properties of the maps for the Heisenberg group targets are studied. For u e∈W1,α(Ω, Hm), some Poincare type inequalities are proved. For the energy minimizers, the ∈-regularity theorems and the singularity theorems are obtained.展开更多
利用Legendrian对偶定理,证明了Anti de Sitter空间中的Lorentzian超曲面存在φ-伪球高斯映射,从而初步建立了Anti de Sitter空间中Lorentzian超曲面的斜几何.进一步的,证明了斜几何的基本定理,完成了φ~±-全脐超曲面的分类并给出...利用Legendrian对偶定理,证明了Anti de Sitter空间中的Lorentzian超曲面存在φ-伪球高斯映射,从而初步建立了Anti de Sitter空间中Lorentzian超曲面的斜几何.进一步的,证明了斜几何的基本定理,完成了φ~±-全脐超曲面的分类并给出了Lorentzian超曲面的φ~±-Anti de Sitter Weingarten型公式.展开更多
开零锥中洛伦兹超曲面的研究难点在于无法利用伪外积运算从切空间中获取该超曲面的法向量.为了解决这一难题,可以借助Legendrian对偶定理的帮助.利用Legendrian对偶定理,构造了开零锥中的Lorentzian超曲面nullcone高斯像,Anti de Sitte...开零锥中洛伦兹超曲面的研究难点在于无法利用伪外积运算从切空间中获取该超曲面的法向量.为了解决这一难题,可以借助Legendrian对偶定理的帮助.利用Legendrian对偶定理,构造了开零锥中的Lorentzian超曲面nullcone高斯像,Anti de Sitter高斯像和伪球高斯像并初步建立了开零锥中洛伦兹超曲面的的斜几何.展开更多
The main goal of this paper is to formulate and prove,under simplified hypothesis,a maximumprinciple in a mathematical framework governed by geometric tools.More precisely,using some techniques of calculus of variatio...The main goal of this paper is to formulate and prove,under simplified hypothesis,a maximumprinciple in a mathematical framework governed by geometric tools.More precisely,using some techniques of calculus of variations,the notion of adjointness and a geometrical context,we establish necessary optimality conditions for two optimal control problems governed by:(i)multiple integral cost functional and(ii)curvilinear integral(mechanical work)cost functional,both subject to fundamental tensor(state variable)evolution as constraint.The control variable is a connection in the considered optimisation problems.Finally,as an application of the geometric maximum principle introduced in this paper,we derive exterior Euler-Lagrange and Hamilton-Pfaff PDEs.展开更多
基金supported by National Natural Science Foundation of China(Grant No.11901534)。
文摘In this paper,we study minimal Legendrian surfacesΣimmersed in the tangent sphere bundle T_(1)R^(3).We classify(1)totally geodesic Legendrian surfaces,(2)closed minimal Legendrian surfaces of genus smaller than or equal to 1 and complete minimal Legendrian surfaces with the non-negative Gauss curvature,and(3)complete stable minimal Legendrian surfaces.
基金supported by SPP 2026:Geometry at Infinity of Deutsche Forschungsgemeinschaft.A part of this work was carried out when the second author visited the University of British Columbia。
文摘In this paper,we first introduce a boundary problem for Lagrangian submanifolds,analogous to the problem for free boundary hypersurfaces and capillary hypersurfaces.Then we present several interesting examples of Lagrangian submanifolds satisfying this boundary condition and we prove a Lagrangian version of the Nitsche(or Hopf)type theorem.Some problems are proposed at the end of this paper.
基金National Natural Science Foundation of China (19771048)
文摘In this paper, the properties of the maps for the Heisenberg group targets are studied. For u e∈W1,α(Ω, Hm), some Poincare type inequalities are proved. For the energy minimizers, the ∈-regularity theorems and the singularity theorems are obtained.
基金National Natural Science Foundation of China(11301215,11101072)Thirteenth Five-Year Program for Science and Technology of Education Department of Jilin Province(2016212)
文摘利用Legendrian对偶定理,证明了Anti de Sitter空间中的Lorentzian超曲面存在φ-伪球高斯映射,从而初步建立了Anti de Sitter空间中Lorentzian超曲面的斜几何.进一步的,证明了斜几何的基本定理,完成了φ~±-全脐超曲面的分类并给出了Lorentzian超曲面的φ~±-Anti de Sitter Weingarten型公式.
文摘开零锥中洛伦兹超曲面的研究难点在于无法利用伪外积运算从切空间中获取该超曲面的法向量.为了解决这一难题,可以借助Legendrian对偶定理的帮助.利用Legendrian对偶定理,构造了开零锥中的Lorentzian超曲面nullcone高斯像,Anti de Sitter高斯像和伪球高斯像并初步建立了开零锥中洛伦兹超曲面的的斜几何.
文摘The main goal of this paper is to formulate and prove,under simplified hypothesis,a maximumprinciple in a mathematical framework governed by geometric tools.More precisely,using some techniques of calculus of variations,the notion of adjointness and a geometrical context,we establish necessary optimality conditions for two optimal control problems governed by:(i)multiple integral cost functional and(ii)curvilinear integral(mechanical work)cost functional,both subject to fundamental tensor(state variable)evolution as constraint.The control variable is a connection in the considered optimisation problems.Finally,as an application of the geometric maximum principle introduced in this paper,we derive exterior Euler-Lagrange and Hamilton-Pfaff PDEs.
