A representation-theoretical proof of Branson's classification of elliptic generalized gradients

Pilca M.

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A representation-theoretical proof of Branson's classification of elliptic generalized gradients

机译：椭圆广义梯度布兰森分类的表示理论证明

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The purpose of this paper is to present a new proof of Branson's classification (Branson, 1997 [3]), of minimal elliptic sums of generalized gradients. The advantage of this proof is that it is local, being mainly based on representation theory and on the relationship between ellipticity and refined Kato inequalities. This approach is promising for the classification of elliptic generalized gradients of G-structures, for other subgroups G of the special orthogonal group.

机译：本文的目的是提出广义梯度的最小椭圆和的布兰森分类的新证明（布兰森，1997 [3]）。该证明的优点是它是局部的，主要基于表示理论以及椭圆度和加藤不等式之间的关系。对于特殊正交群的其他子群G，这种方法有望用于G结构的椭圆广义梯度的分类。

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《Differential geometry and its applications》 |2011年第s1期|共8页
作者
Pilca M.;
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正文语种 eng
中图分类微分几何;
关键词
Elliptic differential operator; Generalized gradient; Kato constant; Kato inequality;

机译：椭圆微分算子;广义梯度;Kato常数;Kato不等式;

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1. A representation-theoretical proof of Branson's classification of elliptic generalized gradients [J] . Pilca M. Differential geometry and its applications . 2011,第S1期

机译：椭圆广义梯度布兰森分类的表示理论证明
2. A new proof of Branson’s classification of elliptic generalized gradients [J] . Mihaela Pilca Manuscripta Mathematica . 2011,第1a2期

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3. A new proof of Branson's classification of elliptic generalized gradients [J] . Pilca M. Manuscripta mathematica . 2011,第1a2期

机译：椭圆广义梯度布兰森分类的新证明
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7. A representation-theoretical proof of Bransonʼs classification of elliptic generalized gradients [O] . Pilca Mihaela 2011

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A representation-theoretical proof of Branson's classification of elliptic generalized gradients

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