CALIBRATION FORMS AND NEW EXAMPLES OF STABLE AND GLOBALLY MINIMAL SURFACES

A. Ivanov
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Abstract

This paper is devoted to the development of methods of investigating the stability and global minimality of specific surfaces in Euclidean space and more generally in the Riemannian manifold. The author has obtained an effective sufficient condition for the stability of symmetric cones of any codimension in Euclidean space. By means of this sufficient condition he has proved the stability of several new series of cones of codimension two and higher. The author has constructed a new class of globally minimal surfaces in locally trivial vector bundles. The proof of the basic theorems is carried out by means of the construction of suitable calibration forms.
校准形式和稳定和全局最小曲面的新例子
本文致力于研究欧几里德空间和黎曼流形中特定曲面的稳定性和全局极小性的方法的发展。得到了欧几里德空间中任意余维对称锥稳定性的一个有效充分条件。利用这一充分条件,他证明了几个余维数为2及以上的新锥级数的稳定性。在局部平凡向量束中构造了一类新的全局极小曲面。通过构造合适的标定形式,对基本定理进行了证明。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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