Minimal area of Finsler disks with minimizing geodesics

IF 2.5 1区 数学 Q1 MATHEMATICS Journal of the European Mathematical Society Pub Date : 2020-10-01 DOI:10.4171/JEMS/1339
Marcos Cossarini, S. Sabourau
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引用次数: 2

Abstract

We show that the Holmes--Thompson area of every Finsler disk of radius $r$ whose interior geodesics are length-minimizing is at least $\frac{6}{\pi} r^2$. Furthermore, we construct examples showing that the inequality is sharp and observe that the equality case is attained by a non-rotationally symmetric metric. This contrasts with Berger's conjecture in the Riemannian case, which asserts that the round hemisphere is extremal. To prove our theorem we discretize the Finsler metric using random geodesics. As an auxiliary result, we show that the integral geometry formulas of Blaschke and Santal\'o hold on Finsler manifolds with almost no trapped geodesics.
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最小测地线的最小芬斯勒圆盘面积
我们证明了半径为$r$且其内部测地线长度最小的每个Finsler盘的Holmes—Thompson面积至少为$\frac{6}{\pi} r^2$。此外,我们构造了证明不等式尖锐的例子,并观察到不等式是通过非旋转对称度量获得的。这与伯杰在黎曼情况下的猜想形成对比,后者断言圆半球是极值的。为了证明我们的定理,我们用随机测地线离散了芬斯勒度量。作为辅助结果,我们证明了Blaschke和Santaló的积分几何公式在几乎没有困测线的Finsler流形上成立。
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来源期刊
CiteScore
4.50
自引率
0.00%
发文量
103
审稿时长
6-12 weeks
期刊介绍: The Journal of the European Mathematical Society (JEMS) is the official journal of the EMS. The Society, founded in 1990, works at promoting joint scientific efforts between the many different structures that characterize European mathematics. JEMS will publish research articles in all active areas of pure and applied mathematics. These will be selected by a distinguished, international board of editors for their outstanding quality and interest, according to the highest international standards. Occasionally, substantial survey papers on topics of exceptional interest will also be published. Starting in 1999, the Journal was published by Springer-Verlag until the end of 2003. Since 2004 it is published by the EMS Publishing House. The first Editor-in-Chief of the Journal was J. Jost, succeeded by H. Brezis in 2004. The Journal of the European Mathematical Society is covered in: Mathematical Reviews (MR), Current Mathematical Publications (CMP), MathSciNet, Zentralblatt für Mathematik, Zentralblatt MATH Database, Science Citation Index (SCI), Science Citation Index Expanded (SCIE), CompuMath Citation Index (CMCI), Current Contents/Physical, Chemical & Earth Sciences (CC/PC&ES), ISI Alerting Services, Journal Citation Reports/Science Edition, Web of Science.
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