On fundamental groups of RCD spaces

IF 1.2 1区数学 Q1 MATHEMATICS

Journal fur die Reine und Angewandte Mathematik Pub Date : 2022-10-13 DOI:10.1515/crelle-2023-0027

Jaime Santos-Rodríguez, Sergio Zamora-Barrera

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引用次数: 7

Abstract

Abstract We obtain results about fundamental groups of RCD ∗ ⁢ ( K , N ) {\mathrm{RCD}^{\ast}(K,N)} spaces previously known under additional conditions such as smoothness or lower sectional curvature bounds. For fixed K ∈ ℝ {K\in\mathbb{R}} , N ∈ [ 1 , ∞ ) {N\in[1,\infty)} , D > 0 {D>0} , we show the following: • There is C > 0 {C>0} such that for each RCD ∗ ⁢ ( K , N ) {\mathrm{RCD}^{\ast}(K,N)} space X of diameter ≤ D {\leq D} , its fundamental group π 1 ⁢ ( X ) {\pi_{1}(X)} is generated by at most C elements. • There is D ~ > 0 {\tilde{D}>0} such that for each RCD ∗ ⁢ ( K , N ) {\mathrm{RCD}^{\ast}(K,N)} space X of diameter ≤ D {\leq D} with compact universal cover X ~ {\tilde{X}} , one has diam ⁡ ( X ~ ) ≤ D ~ {\operatorname{diam}(\tilde{X})\leq\tilde{D}} . • If a sequence of RCD ∗ ⁢ ( 0 , N ) {\mathrm{RCD}^{\ast}(0,N)} spaces X i {X_{i}} of diameter ≤ D {\leq D} and rectifiable dimension n is such that their universal covers X ~ i {\tilde{X}_{i}} converge in the pointed Gromov–Hausdorff sense to a space X of rectifiable dimension n, then there is C > 0 {C>0} such that for each i, the fundamental group π 1 ⁢ ( X i ) {\pi_{1}(X_{i})} contains an abelian subgroup of index ≤ C {\leq C} . • If a sequence of RCD ∗ ⁢ ( K , N ) {\mathrm{RCD}^{\ast}(K,N)} spaces X i {X_{i}} of diameter ≤ D {\leq D} and rectifiable dimension n is such that their universal covers X ~ i {\tilde{X}_{i}} are compact and converge in the pointed Gromov–Hausdorff sense to a space X of rectifiable dimension n, then there is C > 0 {C>0} such that for each i, the fundamental group π 1 ⁢ ( X i ) {\pi_{1}(X_{i})} contains an abelian subgroup of index ≤ C {\leq C} . • If a sequence of RCD ∗ ⁢ ( K , N ) {\mathrm{RCD}^{\ast}(K,N)} spaces X i {X_{i}} with first Betti number ≥ r {\geq r} and rectifiable dimension n converges in the Gromov–Hausdorff sense to a compact space X of rectifiable dimension m, then the first Betti number of X is at least r + m - n {r+m-n} . The main tools are the splitting theorem by Gigli, the splitting blow-up property by Mondino and Naber, the semi-locally-simple-connectedness of RCD ∗ ⁢ ( K , N ) {\mathrm{RCD}^{\ast}(K,N)} spaces by Wang, the isometry group structure by Guijarro and the first author, and the structure of approximate subgroups by Breuillard, Green and Tao.

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关于RCD空间的基本群

摘要在光滑性或下截面曲率界等附加条件下，得到了已知的RCD∗¹(K,N) {\ maththrm {RCD}^{\ast}(K,N)}空间的基本群的结果。对于固定的K∈X {K\in\mathbb{R}}，N∈[1，∞){N\in[1，\infty)}， D b> 0 {D b> 0}，我们证明:•存在C b> 0 {C>0}，使得对于每一个RCD∗(K,N) {\ mathm {RCD}^{\ast}(K,N)}直径≤D {\leq D}的空间X，其基群π 1≠(X) {\pi_{1}(X)}由最多C个元素生成。•存在D ~ > {\tilde{D}>0}，使得对于每个RCD∗(K,N) {\ mathm {RCD}^{\ast}(K,N)}直径≤D {\leq D}的空间X，具有紧致泛盖X ~ {\tilde{X}}，具有diam (X ~)≤D ~ {\operatorname{diam}(\tilde{X})\leq\tilde{D}}。•如果一系列RCD∗⁢(0,N) {\ mathrm {RCD} ^ {\ ast} (0, N)}空间X我{间{我}}的直径≤N维D {\ leq D}和可改正的就是这样,他们普遍覆盖X ~我{\波浪号{X} _{我}}收敛指出Gromov-Hausdorff意义上的N维空间X的方法,然后是C > 0 C >{0},对于每一个我,基本组π1⁢(X i) {\ pi_{1}(间{我})}包含一个交换子群的指数≤C {\ leq C}。•如果一系列RCD∗⁢(K, N) {\ mathrm {RCD} ^ {\ ast} (K, N)}空间X我{间{我}}的直径≤N维D {\ leq D}和可改正的就是这样,他们普遍覆盖X ~我{\波浪号{X} _{我}}是紧凑和收敛指出Gromov-Hausdorff意义上的N维空间X的方法,然后是C > 0 C >{0},对于每一个我,基本组π1⁢(X i) {\ pi_{1}(间{我})}包含一个交换子群的指数≤C {\ leq C}。•如果一个RCD∗(K,N) {\ mathm {RCD}^{\ast}(K,N)}空间序列X i {X_{i}}第一个Betti数≥r {\geq r}且维数N可整流，在Gromov-Hausdorff意义下收敛到一个维数m可整流的紧空间X，则X的第一个Betti数至少为r+m- N {r+m- N}。主要的工具是Gigli的分裂定理，Mondino和Naber的分裂爆破性质，Wang的RCD∗¹(K,N) {\mathrm{RCD}^{\ast}(K,N)}空间的半局部简单连性，Guijarro和第一作者的等距群结构，以及Breuillard, Green和Tao的近似子群结构。

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来源期刊

Journal fur die Reine und Angewandte Mathematik 数学-数学

CiteScore

2.50

自引率

6.70%

发文量

审稿时长

6-12 weeks

期刊介绍： The Journal für die reine und angewandte Mathematik is the oldest mathematics periodical still in existence. Founded in 1826 by August Leopold Crelle and edited by him until his death in 1855, it soon became widely known under the name of Crelle"s Journal. In the almost 180 years of its existence, Crelle"s Journal has developed to an outstanding scholarly periodical with one of the worldwide largest circulations among mathematics journals. It belongs to the very top mathematics periodicals, as listed in ISI"s Journal Citation Report.