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Normalized p-laplacian evolution: boundary behavior of non-negative solutions of fully nonlinear parabolic equations: Gradient bounds for p-harmonic systems with vanishing neumann (dirichlet) data in a convex domain.

机译：归一化的p-拉普拉斯演化：完全非线性抛物方程的非负解的边界行为：具有在凸域中消失的Neumann（dirichlet）数据的p调和系统的梯度界。

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The first part of this thesis is devoted to the study of normalized p-laplacian evolution. The second part of the thesis is concerned with the boundary behavior of non- negative solutions of fully nonlinear parabolic equations. The third part of the thesis contains a partial result in the direction of unique continuation for fully nonlinear parabolic equations. The fourth part of the thesis deals with gradient bounds for p-harmonic systems in convex domains.

机译：本文的第一部分专门研究归一化的p-拉普拉斯演化。论文的第二部分涉及完全非线性抛物方程的非负解的边界性质。论文的第三部分包含了完全非线性抛物方程唯一连续方向的部分结果。论文的第四部分讨论凸域中p调和系统的梯度界。

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作者
Banerjee, Agnid.;
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作者单位

Purdue University.;

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授予单位 Purdue University.;
学科 Mathematics.
学位 Ph.D.
年度 2014
页码 159 p.
总页数 159
原文格式 PDF
正文语种 eng
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1. Gradient bounds for p-harmonic systems with vanishing Neumann (Dirichlet) data in a convex domain [J] . Agnid Banerjee, John L. Lewis Nonlinear Analysis: An International Multidisciplinary Journal . 2014,第Null期

机译：在凸域中具有消失的Neumann（Dirichlet）数据的p调和系统的梯度界
2. Bounds for the Blow-up Time and Blow-up Rate Estimates for Nonlinear Parabolic Equations with Dirichlet or Neumann Boundary Conditions [J] . Yuhua Jian, Zuodong Yang British Journal of Mathematics & Computer Science . 2015,第2期

机译：具有Dirichlet或Neumann边界条件的非线性抛物方程的爆破时间和爆破速率估计的界
3. Bounds for the Blow-up Time and Blow-up RateEstimates for Nonlinear Parabolic Equations withDirichlet or Neumann Boundary Conditions [J] . Yuhua Jian, Zuodong Yang British Journal of Mathematics Computer Science . 2015,第2期

机译：具有Dirichlet或Neumann边界条件的非线性抛物方程的爆破时间和爆破率的界
4. Vibrational stabilization and transient behavior analysis ofnonlinear parabolic systems with Neumann boundary conditions [C] . Bentsman J., Hong K.S. 1993 International Joint Conference on Neural Networks, 1993. IJCNN '93-Nagoya, 1993 . 2001

机译：具Neumann边界条件的非线性抛物线系统的振动稳定与瞬态行为分析
5. Parabolic equations in sub-riemannian spaces: Boundary behavior of non-negative solutions, curvature-dimension inequalities, Li-Yau inequalities. [D] . Munive Lima, Isidro Humberto. 2013

机译：次黎曼空间中的抛物线方程：非负解的边界行为，曲率维不等式，Li-Yau不等式。
6. ASYMPTOTIC BEHAVIOR OF BLOWUP SOLUTIONS OF A PARABOLIC EQUATION WITH THE P-LAPLACIAN(Nonlinear Evolution Equations and Applications) [O] . FUJII ATARU, OHTA MASAHITO 1996

机译：具有P-Laplacian方程的抛物方程解的渐近性质（非线性发展方程和应用）
7. The Solution of the Dirichlet Problem for Lapalce's Equation when the Boundary Data is Discontinuous and the Domain has a Boundary which is of Bounded Rotation by Means of the Lebesgue-Stieltjes Integral Equation for the Double Layer Potential [R] . Cryer, C. W. 1970

机译：利用Lebesgue-stieltjes积分方程对双层势进行边界数据不连续且域具有有界旋转边界的Dirichlet问题的解

Normalized p-laplacian evolution: boundary behavior of non-negative solutions of fully nonlinear parabolic equations: Gradient bounds for p-harmonic systems with vanishing neumann (dirichlet) data in a convex domain.

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