Ricci flow on cone surfaces

被引:3
|
作者
Ramos, Daniel [1 ]
机构
[1] Univ Lisbon, Ctr Matemat Aplicac Fundamentais & Invest Operac, P-1749016 Lisbon, Portugal
来源
PORTUGALIAE MATHEMATICA | 2018年 / 75卷 / 01期
关键词
Ricci flow; Ricci solitons; conical singularities; uniformization theorem; CONVERGENCE; 2-ORBIFOLDS;
D O I
10.4171/PM/2010
中图分类号
O29 [应用数学];
学科分类号
070104 ;
摘要
We study the evolution under the Ricci flow of surfaces with singularities of cone type. Firstly we provide a complete classification of gradient Ricci solitons on surfaces, which is of independent interest. Secondly, we prove that closed cone surfaces with cone angles less or equal to pi converge, up to rescaling, to closed soliton metrics under the Ricci flow.
引用
收藏
页码:11 / 65
页数:55
相关论文
共 50 条
  • [31] Ricci Flow and the Determinant of the Laplacian on Non-Compact Surfaces
    Albin, Pierre
    Aldana, Clara L.
    Rochon, Frederic
    COMMUNICATIONS IN PARTIAL DIFFERENTIAL EQUATIONS, 2013, 38 (04) : 711 - 749
  • [32] Computing general geometric structures on surfaces using Ricci flow
    Jin, Miao
    Luo, Feng
    Gu, Xianfeng David
    COMPUTER-AIDED DESIGN, 2007, 39 (08) : 663 - 675
  • [33] Rotational symmetry and properties of the ancient solutions of Ricci flow on surfaces
    Hsu, Shu-Yu
    GEOMETRIAE DEDICATA, 2013, 162 (01) : 375 - 388
  • [34] Rotational symmetry and properties of the ancient solutions of Ricci flow on surfaces
    Shu-Yu Hsu
    Geometriae Dedicata, 2013, 162 : 375 - 388
  • [35] Singular Ricci Solitons and Their Stability under the Ricci Flow
    Alexakis, Spyros
    Chen, Dezhong
    Fournodavlos, Grigorios
    COMMUNICATIONS IN PARTIAL DIFFERENTIAL EQUATIONS, 2015, 40 (12) : 2123 - 2172
  • [36] THE RICCI-BOURGUIGNON FLOW
    Catino, Giovanni
    Cremaschi, Laura
    Djadli, Zindine
    Mantegazza, Carlo
    Mazzieri, Lorenzo
    PACIFIC JOURNAL OF MATHEMATICS, 2017, 287 (02) : 337 - 370
  • [37] Ricci flow of discrete surfaces of revolution, and relation to constant Gaussian curvature
    Suda, Naoya
    DIFFERENTIAL GEOMETRY AND ITS APPLICATIONS, 2025, 98
  • [38] Estimates and Monotonicity of the First Eigenvalues Under the Ricci Flow on Closed Surfaces
    Fang S.
    Zhao L.
    Zhu P.
    Communications in Mathematics and Statistics, 2016, 4 (2) : 217 - 228
  • [39] BOUNDED RICCI CURVATURE AND POSITIVE SCALAR CURVATURE UNDER RICCI FLOW
    Kroncke, Klaus
    Marxen, Tobias
    Vertman, Boris
    PACIFIC JOURNAL OF MATHEMATICS, 2023, 324 (02) : 295 - 331
  • [40] Collapsing Geometry with Ricci Curvature Bounded Below and Ricci Flow Smoothing
    Huang, Shaosai
    Rong, Xiaochun
    Wang, Bing
    SYMMETRY INTEGRABILITY AND GEOMETRY-METHODS AND APPLICATIONS, 2020, 16
12345