Tubes in sub-Riemannian geometry and a Weyl's invariance result for curves in the Heisenberg groups

arXiv - MATH - Metric Geometry Pub Date : 2024-08-29 DOI:arxiv-2408.16838
Tania Bossio, Luca Rizzi, Tommaso Rossi
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Abstract

The purpose of the paper is threefold: first, we prove optimal regularity results for the distance from $C^k$ submanifolds of general rank-varying sub-Riemannian structures. Then, we study the asymptotics of the volume of tubular neighbourhoods around such submanifolds. Finally, for the case of curves in the Heisenberg groups, we prove a Weyl's invariance result: the volume of small tubes around a curve does not depend on the way the curve is isometrically embedded, but only on its Reeb angle. The proof does not need the computation of the actual volume of the tube, and it is new even for the three-dimensional Heisenberg group.
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亚黎曼几何中的管子和海森堡群曲线的韦尔不变性结果
本文的目的有三个方面:首先,我们证明了一般秩变次黎曼结构的$C^k$子球面距离的最优正则性结果。然后,我们研究这类子曲面周围的管状邻域体积的渐近性。最后,针对海森堡群中曲线的情况,我们证明了韦尔不变性结果:曲线周围小管的体积并不取决于曲线的等距嵌入方式,而只取决于它的里伯角。这个证明不需要计算管子的实际体积,甚至对三维海森堡群来说也是新的。
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arXiv - MATH - Metric Geometry
arXiv - MATH - Metric Geometry
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