可定义族无穷远处的Gauss–Kronecker曲率和等奇异性

Pub Date : 2019-03-19 DOI:10.4310/ajm.2021.v25.n6.a2

N. Dutertre, V. Grandjean

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引用次数: 3

摘要

假设给定一个展开实数的多项式有界0 -极小结构。设$(T_s)_{s\in \mathbb{R}}$是$C^2$- $\mathbb{R}^n$的超曲面的一个全局可定义的单参数族。在定义这种族的广义临界值的概念后，我们证明了函数$s\到|K(s)|$和$s\到K(s)$，分别是$T_s$的总绝对高斯-克罗内克曲率和总高斯-克罗内克曲率，在任何非广义临界值的邻域中是连续的。特别地，这为实多项式的阶族提供了一个必要的等奇性判据。

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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Gauss–Kronecker curvature and equisingularity at infinity of definable families

Assume given a polynomially bounded o-minimal structure expanding the real numbers. Let $(T_s)_{s\in \mathbb{R}}$ be a globally definable one parameter family of $C^2$-hypersurfaces of $\mathbb{R}^n$. Upon defining the notion of generalized critical value for such a family we show that the functions $s \to |K(s)|$ and $s\to K(s)$, respectively the total absolute Gauss-Kronecker and total Gauss-Kronecker curvature of $T_s$, are continuous in any neighbourhood of any value which is not generalized critical. In particular this provides a necessary criterion of equisingularity for the family of the levels of a real polynomial.

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