Property (T) in density-type models of random groups
IF 0.6
3区 数学
Q3 MATHEMATICS
引用次数: 7
Abstract
We study Property (T) in the $\Gamma(n,k,d)$ model of random groups: as $k$ tends to infinity this gives the Gromov density model, introduced in [Gro93]. We provide bounds for Property (T) in the $k$-angular model of random groups, i.e. the $ \Gamma (n,k,d)$ model where $k$ is fixed and $n$ tends to infinity. We also prove that for $d>1\slash 3$, a random group in the $\Gamma(n,k,d)$ model has Property (T) with probability tending to $1$ as $k$ tends to infinity, strengthening the results of \.{Z}uk and Kotowski--Kotowski, who consider only groups in the $\Gamma (n,3k,d)$ model.随机群密度型模型的性质(T)
我们研究了随机群的$\Gamma(n,k,d)$模型中的性质(T):当$k$趋于无穷时,这给出了在[Gro93]中介绍的Gromov密度模型。在随机群的$k$角模型中,即$ \Gamma (n,k,d)$模型中,我们给出了属性(T)的界,其中$k$是固定的,$n$趋于无穷。我们还证明了对于$d>1\斜线3$,$\Gamma(n,k,d)$模型中的一个随机群具有性质(T),当$k$趋于无穷时,其概率趋于$1$,从而加强了\的结果。{Z}uk和Kotowski—Kotowski,他们只考虑$\Gamma (n,3k,d)$模型中的组。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
求助全文
约1分钟内获得全文
求助全文
来源期刊
CiteScore
1.10
自引率
0.00%
发文量
45
审稿时长
>12 weeks
期刊介绍:
Groups, Geometry, and Dynamics is devoted to publication of research articles that focus on groups or group actions as well as articles in other areas of mathematics in which groups or group actions are used as a main tool. The journal covers all topics of modern group theory with preference given to geometric, asymptotic and combinatorial group theory, dynamics of group actions, probabilistic and analytical methods, interaction with ergodic theory and operator algebras, and other related fields.
Topics covered include:
geometric group theory;
asymptotic group theory;
combinatorial group theory;
probabilities on groups;
computational aspects and complexity;
harmonic and functional analysis on groups, free probability;
ergodic theory of group actions;
cohomology of groups and exotic cohomologies;
groups and low-dimensional topology;
group actions on trees, buildings, rooted trees.
求助内容:
应助结果提醒方式:
京公网安备 11010802042870号
