卢瓦纳-库法里夫能量和魏尔-彼得森准圆的叶状结构

IF 1.5 1区数学 Q1 MATHEMATICS Proceedings of the London Mathematical Society Pub Date : 2024-02-13 DOI:10.1112/plms.12582

Fredrik Viklund, Yilin Wang

{"title":"卢瓦纳-库法里夫能量和魏尔-彼得森准圆的叶状结构","authors":"Fredrik Viklund, Yilin Wang","doi":"10.1112/plms.12582","DOIUrl":null,"url":null,"abstract":"We study foliations by chord–arc Jordan curves of the twice punctured Riemann sphere <mjx-container aria-label=\"double struck upper C minus StartSet 0 EndSet\" ctxtmenu_counter=\"0\" ctxtmenu_oldtabindex=\"1\" jax=\"CHTML\" role=\"application\" sre-explorer- style=\"font-size: 103%; position: relative;\" tabindex=\"0\"><mjx-math aria-hidden=\"true\"><mjx-semantics><mjx-mrow data-semantic-children=\"0,5\" data-semantic-content=\"1\" data-semantic- data-semantic-role=\"subtraction\" data-semantic-speech=\"double struck upper C minus StartSet 0 EndSet\" data-semantic-type=\"infixop\"><mjx-mi data-semantic-font=\"double-struck\" data-semantic- data-semantic-parent=\"6\" data-semantic-role=\"numbersetletter\" data-semantic-type=\"identifier\"><mjx-c></mjx-c></mjx-mi><mjx-mo data-semantic- data-semantic-operator=\"infixop,∖\" data-semantic-parent=\"6\" data-semantic-role=\"subtraction\" data-semantic-type=\"operator\" rspace=\"4\" space=\"4\"><mjx-c></mjx-c></mjx-mo><mjx-mrow data-semantic-children=\"3\" data-semantic-content=\"2,4\" data-semantic- data-semantic-parent=\"6\" data-semantic-role=\"set singleton\" data-semantic-type=\"fenced\"><mjx-mo data-semantic- data-semantic-operator=\"fenced\" data-semantic-parent=\"5\" data-semantic-role=\"open\" data-semantic-type=\"fence\" style=\"margin-left: 0.056em; margin-right: 0.056em;\"><mjx-c></mjx-c></mjx-mo><mjx-mn data-semantic-annotation=\"clearspeak:simple\" data-semantic-font=\"normal\" data-semantic- data-semantic-parent=\"5\" data-semantic-role=\"integer\" data-semantic-type=\"number\"><mjx-c></mjx-c></mjx-mn><mjx-mo data-semantic- data-semantic-operator=\"fenced\" data-semantic-parent=\"5\" data-semantic-role=\"close\" data-semantic-type=\"fence\" style=\"margin-left: 0.056em; margin-right: 0.056em;\"><mjx-c></mjx-c></mjx-mo></mjx-mrow></mjx-mrow></mjx-semantics></mjx-math><mjx-assistive-mml aria-hidden=\"true\" display=\"inline\" unselectable=\"on\"><math altimg=\"/cms/asset/18b294c8-16a0-4c92-85bd-1f96c88b00a8/plms12582-math-0001.png\" xmlns=\"http://www.w3.org/1998/Math/MathML\"><semantics><mrow data-semantic-=\"\" data-semantic-children=\"0,5\" data-semantic-content=\"1\" data-semantic-role=\"subtraction\" data-semantic-speech=\"double struck upper C minus StartSet 0 EndSet\" data-semantic-type=\"infixop\"><mi data-semantic-=\"\" data-semantic-font=\"double-struck\" data-semantic-parent=\"6\" data-semantic-role=\"numbersetletter\" data-semantic-type=\"identifier\" mathvariant=\"double-struck\">C</mi><mo data-semantic-=\"\" data-semantic-operator=\"infixop,∖\" data-semantic-parent=\"6\" data-semantic-role=\"subtraction\" data-semantic-type=\"operator\">∖</mo><mrow data-semantic-=\"\" data-semantic-children=\"3\" data-semantic-content=\"2,4\" data-semantic-parent=\"6\" data-semantic-role=\"set singleton\" data-semantic-type=\"fenced\"><mo data-semantic-=\"\" data-semantic-operator=\"fenced\" data-semantic-parent=\"5\" data-semantic-role=\"open\" data-semantic-type=\"fence\" stretchy=\"false\">{</mo><mn data-semantic-=\"\" data-semantic-annotation=\"clearspeak:simple\" data-semantic-font=\"normal\" data-semantic-parent=\"5\" data-semantic-role=\"integer\" data-semantic-type=\"number\">0</mn><mo data-semantic-=\"\" data-semantic-operator=\"fenced\" data-semantic-parent=\"5\" data-semantic-role=\"close\" data-semantic-type=\"fence\" stretchy=\"false\">}</mo></mrow></mrow>$\\mathbb {C} \\setminus \\lbrace 0\\rbrace$</annotation></semantics></math></mjx-assistive-mml></mjx-container> using the Loewner–Kufarev equation. We associate to such a foliation a function on the plane that describes the “local winding” along each leaf. Our main theorem is that this function has finite Dirichlet energy if and only if the Loewner driving measure <mjx-container aria-label=\"rho\" ctxtmenu_counter=\"1\" ctxtmenu_oldtabindex=\"1\" jax=\"CHTML\" role=\"application\" sre-explorer- style=\"font-size: 103%; position: relative;\" tabindex=\"0\"><mjx-math aria-hidden=\"true\"><mjx-semantics><mjx-mi data-semantic-annotation=\"clearspeak:simple\" data-semantic-font=\"italic\" data-semantic- data-semantic-role=\"greekletter\" data-semantic-speech=\"rho\" data-semantic-type=\"identifier\"><mjx-c></mjx-c></mjx-mi></mjx-semantics></mjx-math><mjx-assistive-mml aria-hidden=\"true\" display=\"inline\" unselectable=\"on\"><math altimg=\"/cms/asset/bb24b5d9-08f0-438c-998d-3ddf73cde132/plms12582-math-0002.png\" xmlns=\"http://www.w3.org/1998/Math/MathML\"><semantics><mi data-semantic-=\"\" data-semantic-annotation=\"clearspeak:simple\" data-semantic-font=\"italic\" data-semantic-role=\"greekletter\" data-semantic-speech=\"rho\" data-semantic-type=\"identifier\">ρ</mi>$\\rho$</annotation></semantics></math></mjx-assistive-mml></mjx-container> has finite Loewner–Kufarev energy, defined by","PeriodicalId":49667,"journal":{"name":"Proceedings of the London Mathematical Society","volume":"55 1","pages":""},"PeriodicalIF":1.5000,"publicationDate":"2024-02-13","publicationTypes":"Journal Article","fieldsOfStudy":null,"isOpenAccess":false,"openAccessPdf":"","citationCount":"0","resultStr":"{\"title\":\"The Loewner–Kufarev energy and foliations by Weil–Petersson quasicircles\",\"authors\":\"Fredrik Viklund, Yilin Wang\",\"doi\":\"10.1112/plms.12582\",\"DOIUrl\":null,\"url\":null,\"abstract\":\"We study foliations by chord–arc Jordan curves of the twice punctured Riemann sphere <mjx-container aria-label=\\\"double struck upper C minus StartSet 0 EndSet\\\" ctxtmenu_counter=\\\"0\\\" ctxtmenu_oldtabindex=\\\"1\\\" jax=\\\"CHTML\\\" role=\\\"application\\\" sre-explorer- style=\\\"font-size: 103%; position: relative;\\\" tabindex=\\\"0\\\"><mjx-math aria-hidden=\\\"true\\\"><mjx-semantics><mjx-mrow data-semantic-children=\\\"0,5\\\" data-semantic-content=\\\"1\\\" data-semantic- data-semantic-role=\\\"subtraction\\\" data-semantic-speech=\\\"double struck upper C minus StartSet 0 EndSet\\\" data-semantic-type=\\\"infixop\\\"><mjx-mi data-semantic-font=\\\"double-struck\\\" data-semantic- data-semantic-parent=\\\"6\\\" data-semantic-role=\\\"numbersetletter\\\" data-semantic-type=\\\"identifier\\\"><mjx-c></mjx-c></mjx-mi><mjx-mo data-semantic- data-semantic-operator=\\\"infixop,∖\\\" data-semantic-parent=\\\"6\\\" data-semantic-role=\\\"subtraction\\\" data-semantic-type=\\\"operator\\\" rspace=\\\"4\\\" space=\\\"4\\\"><mjx-c></mjx-c></mjx-mo><mjx-mrow data-semantic-children=\\\"3\\\" data-semantic-content=\\\"2,4\\\" data-semantic- data-semantic-parent=\\\"6\\\" data-semantic-role=\\\"set singleton\\\" data-semantic-type=\\\"fenced\\\"><mjx-mo data-semantic- data-semantic-operator=\\\"fenced\\\" data-semantic-parent=\\\"5\\\" data-semantic-role=\\\"open\\\" data-semantic-type=\\\"fence\\\" style=\\\"margin-left: 0.056em; margin-right: 0.056em;\\\"><mjx-c></mjx-c></mjx-mo><mjx-mn data-semantic-annotation=\\\"clearspeak:simple\\\" data-semantic-font=\\\"normal\\\" data-semantic- data-semantic-parent=\\\"5\\\" data-semantic-role=\\\"integer\\\" data-semantic-type=\\\"number\\\"><mjx-c></mjx-c></mjx-mn><mjx-mo data-semantic- data-semantic-operator=\\\"fenced\\\" data-semantic-parent=\\\"5\\\" data-semantic-role=\\\"close\\\" data-semantic-type=\\\"fence\\\" style=\\\"margin-left: 0.056em; margin-right: 0.056em;\\\"><mjx-c></mjx-c></mjx-mo></mjx-mrow></mjx-mrow></mjx-semantics></mjx-math><mjx-assistive-mml aria-hidden=\\\"true\\\" display=\\\"inline\\\" unselectable=\\\"on\\\"><math altimg=\\\"/cms/asset/18b294c8-16a0-4c92-85bd-1f96c88b00a8/plms12582-math-0001.png\\\" xmlns=\\\"http://www.w3.org/1998/Math/MathML\\\"><semantics><mrow data-semantic-=\\\"\\\" data-semantic-children=\\\"0,5\\\" data-semantic-content=\\\"1\\\" data-semantic-role=\\\"subtraction\\\" data-semantic-speech=\\\"double struck upper C minus StartSet 0 EndSet\\\" data-semantic-type=\\\"infixop\\\"><mi data-semantic-=\\\"\\\" data-semantic-font=\\\"double-struck\\\" data-semantic-parent=\\\"6\\\" data-semantic-role=\\\"numbersetletter\\\" data-semantic-type=\\\"identifier\\\" mathvariant=\\\"double-struck\\\">C</mi><mo data-semantic-=\\\"\\\" data-semantic-operator=\\\"infixop,∖\\\" data-semantic-parent=\\\"6\\\" data-semantic-role=\\\"subtraction\\\" data-semantic-type=\\\"operator\\\">∖</mo><mrow data-semantic-=\\\"\\\" data-semantic-children=\\\"3\\\" data-semantic-content=\\\"2,4\\\" data-semantic-parent=\\\"6\\\" data-semantic-role=\\\"set singleton\\\" data-semantic-type=\\\"fenced\\\"><mo data-semantic-=\\\"\\\" data-semantic-operator=\\\"fenced\\\" data-semantic-parent=\\\"5\\\" data-semantic-role=\\\"open\\\" data-semantic-type=\\\"fence\\\" stretchy=\\\"false\\\">{</mo><mn data-semantic-=\\\"\\\" data-semantic-annotation=\\\"clearspeak:simple\\\" data-semantic-font=\\\"normal\\\" data-semantic-parent=\\\"5\\\" data-semantic-role=\\\"integer\\\" data-semantic-type=\\\"number\\\">0</mn><mo data-semantic-=\\\"\\\" data-semantic-operator=\\\"fenced\\\" data-semantic-parent=\\\"5\\\" data-semantic-role=\\\"close\\\" data-semantic-type=\\\"fence\\\" stretchy=\\\"false\\\">}</mo></mrow></mrow>$\\\\mathbb {C} \\\\setminus \\\\lbrace 0\\\\rbrace$</annotation></semantics></math></mjx-assistive-mml></mjx-container> using the Loewner–Kufarev equation. We associate to such a foliation a function on the plane that describes the “local winding” along each leaf. Our main theorem is that this function has finite Dirichlet energy if and only if the Loewner driving measure <mjx-container aria-label=\\\"rho\\\" ctxtmenu_counter=\\\"1\\\" ctxtmenu_oldtabindex=\\\"1\\\" jax=\\\"CHTML\\\" role=\\\"application\\\" sre-explorer- style=\\\"font-size: 103%; position: relative;\\\" tabindex=\\\"0\\\"><mjx-math aria-hidden=\\\"true\\\"><mjx-semantics><mjx-mi data-semantic-annotation=\\\"clearspeak:simple\\\" data-semantic-font=\\\"italic\\\" data-semantic- data-semantic-role=\\\"greekletter\\\" data-semantic-speech=\\\"rho\\\" data-semantic-type=\\\"identifier\\\"><mjx-c></mjx-c></mjx-mi></mjx-semantics></mjx-math><mjx-assistive-mml aria-hidden=\\\"true\\\" display=\\\"inline\\\" unselectable=\\\"on\\\"><math altimg=\\\"/cms/asset/bb24b5d9-08f0-438c-998d-3ddf73cde132/plms12582-math-0002.png\\\" xmlns=\\\"http://www.w3.org/1998/Math/MathML\\\"><semantics><mi data-semantic-=\\\"\\\" data-semantic-annotation=\\\"clearspeak:simple\\\" data-semantic-font=\\\"italic\\\" data-semantic-role=\\\"greekletter\\\" data-semantic-speech=\\\"rho\\\" data-semantic-type=\\\"identifier\\\">ρ</mi>$\\\\rho$</annotation></semantics></math></mjx-assistive-mml></mjx-container> has finite Loewner–Kufarev energy, defined by\",\"PeriodicalId\":49667,\"journal\":{\"name\":\"Proceedings of the London Mathematical Society\",\"volume\":\"55 1\",\"pages\":\"\"},\"PeriodicalIF\":1.5000,\"publicationDate\":\"2024-02-13\",\"publicationTypes\":\"Journal Article\",\"fieldsOfStudy\":null,\"isOpenAccess\":false,\"openAccessPdf\":\"\",\"citationCount\":\"0\",\"resultStr\":null,\"platform\":\"Semanticscholar\",\"paperid\":null,\"PeriodicalName\":\"Proceedings of the London Mathematical Society\",\"FirstCategoryId\":\"100\",\"ListUrlMain\":\"https://doi.org/10.1112/plms.12582\",\"RegionNum\":1,\"RegionCategory\":\"数学\",\"ArticlePicture\":[],\"TitleCN\":null,\"AbstractTextCN\":null,\"PMCID\":null,\"EPubDate\":\"\",\"PubModel\":\"\",\"JCR\":\"Q1\",\"JCRName\":\"MATHEMATICS\",\"Score\":null,\"Total\":0}","platform":"Semanticscholar","paperid":null,"PeriodicalName":"Proceedings of the London Mathematical Society","FirstCategoryId":"100","ListUrlMain":"https://doi.org/10.1112/plms.12582","RegionNum":1,"RegionCategory":"数学","ArticlePicture":[],"TitleCN":null,"AbstractTextCN":null,"PMCID":null,"EPubDate":"","PubModel":"","JCR":"Q1","JCRName":"MATHEMATICS","Score":null,"Total":0}

引用次数: 0

摘要

我们通过两次穿刺黎曼球 C∖{0}$\mathbb{C}的弦弧乔丹曲线来研究叶形。\setminus \lbrace 0\rbrace$ 使用卢瓦纳-库法列夫方程。我们将平面上的一个函数与这样的叶片关联起来，这个函数描述了沿每个叶片的 "局部卷绕"。我们的主要定理是，当且仅当洛厄纳驱动度量 ρ$\rho$ 具有有限的洛厄纳-库法列弗能量时，这个函数才具有有限的迪里夏特能量，其定义为

本文章由计算机程序翻译，如有差异，请以英文原文为准。

查看原文

微信好友朋友圈 QQ好友复制链接

本刊更多论文

The Loewner–Kufarev energy and foliations by Weil–Petersson quasicircles

We study foliations by chord–arc Jordan curves of the twice punctured Riemann sphere

C ∖ {0} $\mathbb {C} \setminus \lbrace 0\rbrace$

using the Loewner–Kufarev equation. We associate to such a foliation a function on the plane that describes the “local winding” along each leaf. Our main theorem is that this function has finite Dirichlet energy if and only if the Loewner driving measure

ρ $\rho$

has finite Loewner–Kufarev energy, defined by

求助全文

通过发布文献求助，成功后即可免费获取论文全文。去求助

来源期刊

Proceedings of the London Mathematical Society 数学-数学

CiteScore

2.90

自引率

0.00%

发文量

审稿时长

6-12 weeks

期刊介绍： The Proceedings of the London Mathematical Society is the flagship journal of the LMS. It publishes articles of the highest quality and significance across a broad range of mathematics. There are no page length restrictions for submitted papers. The Proceedings has its own Editorial Board separate from that of the Journal, Bulletin and Transactions of the LMS.

期刊最新文献

Quasi-F-splittings in birational geometry II Total Cuntz semigroup, extension, and Elliott Conjecture with real rank zero Off-diagonal estimates for the helical maximal function Corrigendum: Model theory of fields with virtually free group actions Signed permutohedra, delta-matroids, and beyond