Gate lattices and the stabilized automorphism group

IF 0.7 1区 数学 Q2 MATHEMATICS Journal of Modern Dynamics Pub Date : 2023-01-01 DOI:10.3934/jmd.2023018
Ville Salo
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Abstract

We study the stabilized automorphism group of a subshift of finite type with a certain gluing property called the eventual filling property, on a residually finite group $ G $. We show that the stabilized automorphism group is simply monolithic, i.e., it has a unique minimal non-trivial normal subgroup—the monolith—which is additionally simple. To describe the monolith, we introduce gate lattices, which apply (reversible logical) gates on finite-index subgroups of $ G $. The monolith is then precisely the commutator subgroup of the group generated by gate lattices. If the subshift and the group $ G $ have some additional properties, then the gate lattices generate a perfect group, thus they generate the monolith. In particular, this is always the case when the acting group is the integers. In this case we can also show that gate lattices generate the inert part of the stabilized automorphism group. Thus we obtain that the stabilized inert automorphism group of a one-dimensional mixing subshift of finite type is simple.
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门格与稳定自同构群
研究了在剩余有限群$ G $上具有一定胶合性质的有限型子位移的稳定自同构群。我们证明了稳定自同构群是简单整体的,即它有一个唯一的最小非平凡正规子群-整体,它是额外简单的。为了描述整体结构,我们引入栅格,在$ G $的有限指数子群上应用(可逆逻辑)栅格。因此,该整体恰好是栅极所产生的群的换向子群。如果子移和群$ G $具有一些额外的性质,则栅格生成一个完美的群,从而生成单体。特别是,当作用群是整数时,这种情况总是存在的。在这种情况下,我们也可以证明栅格产生稳定自同构群的惰性部分。由此得出一维有限型混合子移的稳定惰性自同构群是简单的。
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来源期刊
CiteScore
1.30
自引率
0.00%
发文量
11
审稿时长
>12 weeks
期刊介绍: The Journal of Modern Dynamics (JMD) is dedicated to publishing research articles in active and promising areas in the theory of dynamical systems with particular emphasis on the mutual interaction between dynamics and other major areas of mathematical research, including: Number theory Symplectic geometry Differential geometry Rigidity Quantum chaos Teichmüller theory Geometric group theory Harmonic analysis on manifolds. The journal is published by the American Institute of Mathematical Sciences (AIMS) with the support of the Anatole Katok Center for Dynamical Systems and Geometry at the Pennsylvania State University.
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