论芬斯勒流形子流形的焦点位置

Aritra Bhowmick, Sachchidanand Prasad
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摘要

在本文中,我们研究了前向完整芬斯勒流形中封闭(不一定紧凑)子流形的焦点位置。我们的主要目标是证明相关的法向指数图在华纳(F.W. Warner)的意义上是(emph{regular}的(textit{Am. J. of Math.},87,1965)。这就证明了法向指数在切焦点附近是非注入的这一事实。作为应用,根据毕晓普的工作 (\textit{Proc.Amer.Math.Soc.},65,1977),我们把切线切点表达为某一组点的闭包,称为分离切点。这加强了本文作者之前的研究成果 (textit{J. Geom. Anal.},34,2024)。
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On the Focal Locus of Submanifold of a Finsler Manifold
In this article, we investigate the focal locus of closed (not necessarily compact) submanifolds in a forward complete Finsler manifold. The main goal is to show that the associated normal exponential map is \emph{regular} in the sense of F.W. Warner (\textit{Am. J. of Math.}, 87, 1965). This leads to the proof of the fact that the normal exponential is non-injective near tangent focal points. As an application, following R.L. Bishop's work (\textit{Proc. Amer. Math. Soc.}, 65, 1977), we express the tangent cut locus as a closure of a certain set of points, called separating tangent cut points. This strengthens the results from the present authors' previous work (\textit{J. Geom. Anal.}, 34, 2024).
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