{"title":"芬斯勒流形上著名函数不等式的失效:$S$曲率的影响","authors":"Alexandru Kristály, Benling Li, Wei Zhao","doi":"arxiv-2409.05497","DOIUrl":null,"url":null,"abstract":"The validity of functional inequalities on Finsler metric measure manifolds\nis based on three non-Riemannian quantities, namely, the reversibility, flag\ncurvature and $S$-curvature induced by the measure. Under mild assumptions on\nthe reversibility and flag curvature, it turned out that famous functional\ninequalities -- as Hardy inequality, Heisenberg--Pauli--Weyl uncertainty\nprinciple and Caffarelli--Kohn--Nirenberg inequality -- usually hold on forward\ncomplete Finsler manifolds with non-positive $S$-curvature, cf. Huang,\nKrist\\'aly and Zhao [Trans. Amer. Math. Soc., 2020]. In this paper however we\nprove that -- under similar assumptions on the reversibility and flag curvature\nas before -- the aforementioned functional inequalities fail whenever the\n$S$-curvature is positive. Accordingly, our results clearly reveal the deep\ndependence of functional inequalities on the $S$-curvature. As a consequence of\nthese results, we establish surprising analytic aspects of Finsler manifolds:\nif the flag curvature is non-positive, the Ricci curvature is bounded from\nbelow and the $S$-curvature is positive, then the reversibility turns out to be\ninfinite. Examples are presented on general Funk metric spaces, where the\n$S$-curvature plays again a decisive role.","PeriodicalId":501113,"journal":{"name":"arXiv - MATH - Differential Geometry","volume":"117 1","pages":""},"PeriodicalIF":0.0000,"publicationDate":"2024-09-09","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":"{\"title\":\"Failure of famous functional inequalities on Finsler manifolds: the influence of $S$-curvature\",\"authors\":\"Alexandru Kristály, Benling Li, Wei Zhao\",\"doi\":\"arxiv-2409.05497\",\"DOIUrl\":null,\"url\":null,\"abstract\":\"The validity of functional inequalities on Finsler metric measure manifolds\\nis based on three non-Riemannian quantities, namely, the reversibility, flag\\ncurvature and $S$-curvature induced by the measure. Under mild assumptions on\\nthe reversibility and flag curvature, it turned out that famous functional\\ninequalities -- as Hardy inequality, Heisenberg--Pauli--Weyl uncertainty\\nprinciple and Caffarelli--Kohn--Nirenberg inequality -- usually hold on forward\\ncomplete Finsler manifolds with non-positive $S$-curvature, cf. Huang,\\nKrist\\\\'aly and Zhao [Trans. Amer. Math. Soc., 2020]. In this paper however we\\nprove that -- under similar assumptions on the reversibility and flag curvature\\nas before -- the aforementioned functional inequalities fail whenever the\\n$S$-curvature is positive. Accordingly, our results clearly reveal the deep\\ndependence of functional inequalities on the $S$-curvature. As a consequence of\\nthese results, we establish surprising analytic aspects of Finsler manifolds:\\nif the flag curvature is non-positive, the Ricci curvature is bounded from\\nbelow and the $S$-curvature is positive, then the reversibility turns out to be\\ninfinite. Examples are presented on general Funk metric spaces, where the\\n$S$-curvature plays again a decisive role.\",\"PeriodicalId\":501113,\"journal\":{\"name\":\"arXiv - MATH - Differential Geometry\",\"volume\":\"117 1\",\"pages\":\"\"},\"PeriodicalIF\":0.0000,\"publicationDate\":\"2024-09-09\",\"publicationTypes\":\"Journal Article\",\"fieldsOfStudy\":null,\"isOpenAccess\":false,\"openAccessPdf\":\"\",\"citationCount\":\"0\",\"resultStr\":null,\"platform\":\"Semanticscholar\",\"paperid\":null,\"PeriodicalName\":\"arXiv - MATH - Differential Geometry\",\"FirstCategoryId\":\"1085\",\"ListUrlMain\":\"https://doi.org/arxiv-2409.05497\",\"RegionNum\":0,\"RegionCategory\":null,\"ArticlePicture\":[],\"TitleCN\":null,\"AbstractTextCN\":null,\"PMCID\":null,\"EPubDate\":\"\",\"PubModel\":\"\",\"JCR\":\"\",\"JCRName\":\"\",\"Score\":null,\"Total\":0}","platform":"Semanticscholar","paperid":null,"PeriodicalName":"arXiv - MATH - Differential Geometry","FirstCategoryId":"1085","ListUrlMain":"https://doi.org/arxiv-2409.05497","RegionNum":0,"RegionCategory":null,"ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"","JCRName":"","Score":null,"Total":0}
引用次数: 0
摘要
芬斯勒度量流形上函数不等式的有效性基于三个非黎曼量,即度量引起的可逆性、旗曲率和$S$曲率。在对可逆性和旗曲率的温和假设下,结果发现著名的函数不等式--如Hardy不等式、Heisenberg--Pauli--Weyltyprinciple和Caffarelli--Kohn--Nirenberg不等式--通常在具有非正$S$曲率的前向完全Finsler流形上成立,参见Huang, Krist\'aly and Zhao [Trans. Amer. Math. Soc., 2020]。然而,在本文中,我们证明--在与之前相似的可逆性和旗曲率假设下--只要$S$曲率为正,上述函数不等式就失效。因此,我们的结果清楚地揭示了函数不等式对$S$曲率的深刻依赖性。由于这些结果,我们建立了令人惊讶的芬斯勒流形的分析方面:如果旗曲率是非正的,里奇曲率从下往上是有界的,而$S$曲率是正的,那么可逆性就会变成无限的。在一般丰克度量空间中,$S$曲率也起着决定性的作用。
Failure of famous functional inequalities on Finsler manifolds: the influence of $S$-curvature
The validity of functional inequalities on Finsler metric measure manifolds
is based on three non-Riemannian quantities, namely, the reversibility, flag
curvature and $S$-curvature induced by the measure. Under mild assumptions on
the reversibility and flag curvature, it turned out that famous functional
inequalities -- as Hardy inequality, Heisenberg--Pauli--Weyl uncertainty
principle and Caffarelli--Kohn--Nirenberg inequality -- usually hold on forward
complete Finsler manifolds with non-positive $S$-curvature, cf. Huang,
Krist\'aly and Zhao [Trans. Amer. Math. Soc., 2020]. In this paper however we
prove that -- under similar assumptions on the reversibility and flag curvature
as before -- the aforementioned functional inequalities fail whenever the
$S$-curvature is positive. Accordingly, our results clearly reveal the deep
dependence of functional inequalities on the $S$-curvature. As a consequence of
these results, we establish surprising analytic aspects of Finsler manifolds:
if the flag curvature is non-positive, the Ricci curvature is bounded from
below and the $S$-curvature is positive, then the reversibility turns out to be
infinite. Examples are presented on general Funk metric spaces, where the
$S$-curvature plays again a decisive role.