Parabolic groups acting on one-dimensional compact spaces

被引：3

作者：

Dahmani, F ^{[1
]}

机构：

[1] Univ Toulouse 3, Lab E Picard, F-31062 Toulouse, France

来源：

INTERNATIONAL JOURNAL OF ALGEBRA AND COMPUTATION | 2005年 / 15卷 / 5-6期

关键词：

relatively hyperbolic groups; boundaries of groups; Sierpinski carpet;

D O I：

10.1142/S0218196705002530

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

Given a class of compact spaces, we ask which groups can be maximal parabolic subgroups of a relatively hyperbolic group whose boundary is in the class. We investigate the class of one-dimensional connected boundaries. We get that any non-torsion infinite finitely-generated group is a maximal parabolic subgroup of some relatively hyperbolic group with connected one-dimensional boundary without global cut point. For boundaries homeomorphic to a Sierpinski carpet or a 2-sphere, the only maximal parabolic subgroups allowed are virtual surface groups (hyperbolic, or virtually Z + Z).

引用

页码：893 / 906

页数：14

共 50 条

[1] The fundamental groups of one-dimensional spaces
Eda, K
Kawamura, K
[J]. TOPOLOGY AND ITS APPLICATIONS, 1998, 87 (03) : 163 - 172
[2] On the fundamental groups of one-dimensional spaces
Cannon, J. W.
Conner, G. R.
[J]. TOPOLOGY AND ITS APPLICATIONS, 2006, 153 (14) : 2648 - 2672
[3] Fundamental groups of one-dimensional spaces
Dorfer, Gerhard
Thuswaldner, Joerg M.
Winkler, Reinhard
[J]. FUNDAMENTA MATHEMATICAE, 2013, 223 (02) : 137 - 169
[4] CHAOS ON ONE-DIMENSIONAL COMPACT METRIC SPACES
Kocan, Zdenek
[J]. INTERNATIONAL JOURNAL OF BIFURCATION AND CHAOS, 2012, 22 (10):
[5] One-dimensional metric foliations on compact Lie groups
Munteanu, M
[J]. MICHIGAN MATHEMATICAL JOURNAL, 2006, 54 (01) : 25 - 32
[6] Fundamental groups of one-dimensional spaces and spatial homomorphisms
Eda, K
[J]. TOPOLOGY AND ITS APPLICATIONS, 2002, 123 (03) : 479 - 505
[7] Pseudofinite primitive permutation groups acting on one-dimensional sets
Zou, Tingxiang
[J]. FUNDAMENTA MATHEMATICAE, 2020, 250 (02) : 117 - 149
[8] ONE-DIMENSIONAL LEFSCHETZ GROUP OF LOCALLY COMPACT HOMOGENEOUS SPACES
WANG, HC
[J]. BULLETIN OF THE AMERICAN MATHEMATICAL SOCIETY, 1952, 58 (02) : 207 - 207
[9] A linearized compact difference scheme for an one-dimensional parabolic inverse problem
Ye, Chao-rong
Sun, Zhi-zhong
[J]. APPLIED MATHEMATICAL MODELLING, 2009, 33 (03) : 1521 - 1528
[10] A REMARK ON THE SOLVABILITY FOR NONLINEAR PARABOLIC INTEGRODIFFERENTIAL EQUATIONS IN ONE-DIMENSIONAL SPACES
CANNON, JR
LIN, YP
[J]. BOLLETTINO DELLA UNIONE MATEMATICA ITALIANA, 1991, 5B (04): : 853 - 874

← 1 2 3 4 5 →