Towers and the First-order Theories of Hyperbolic Groups

IF 4.6 Q2 MATERIALS SCIENCE, BIOMATERIALS ACS Applied Bio Materials Pub Date : 2024-04-01 DOI:10.1090/memo/1477
Vincent Guirardel, Gilbert Levitt, R. Sklinos
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Abstract

This paper is devoted to the first-order theories of torsion-free hyperbolic groups. One of its purposes is to review some results and to provide precise and correct statements and definitions, as well as some proofs and new results. A key concept is that of a tower (Sela) or NTQ system (Kharlampovich-Myasnikov). We discuss them thoroughly. We state and prove a new general theorem which unifies several results in the literature: elementarily equivalent torsion-free hyperbolic groups have isomorphic cores (Sela); if H H is elementarily embedded in a torsion-free hyperbolic group G G , then G G is a tower over H H relative to H H (Perin); free groups (Perin-Sklinos, Ould-Houcine), and more generally free products of prototypes and free groups, are homogeneous. The converse to Sela and Perin’s results just mentioned is true. This follows from the solution to Tarski’s problem on elementary equivalence of free groups, due independently to Sela and Kharlampovich-Myasnikov, which we treat as a black box throughout the paper. We present many examples and counterexamples, and we prove some new model-theoretic results. We characterize prime models among torsion-free hyperbolic groups, and minimal models among elementarily free groups. Using Fraïssé’s method, we associate to every torsion-free hyperbolic group H H a unique homogeneous countable group M {\mathcal {M}} in which any hyperbolic group H ′ H’ elementarily equivalent to H H has an elementary embedding. In an appendix we give a complete proof of the fact, due to Sela, that towers over a torsion-free hyperbolic group H H are H H -limit groups.
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塔与双曲群的一阶理论
本文专门讨论无扭双曲群的一阶理论。本文的目的之一是回顾一些结果,并提供精确、正确的陈述和定义,以及一些证明和新结果。一个关键概念是塔(Sela)或 NTQ 系统(Kharlampovich-Myasnikov)。我们阐述并证明了一个新的一般定理,它统一了文献中的几个结果:元素等价的无扭双曲群具有同构核(塞拉);如果 H H 元素嵌入无扭双曲群 G G 中,那么相对于 H H,G G 是 H H 上的塔(佩林);自由群(佩林-斯克利诺斯,乌尔德-侯辛),以及更一般的原型和自由群的自由积,都是同质的。刚才提到的塞拉和佩林结果的反面是真的。我们提出了许多例子和反例,并证明了一些新的模型理论结果。我们描述了无扭双曲群中的质模型和无元素群中的最小模型。利用弗雷泽的方法,我们给每个无扭双曲群 H H 关联了一个唯一的同质可数群 M {mathcal {M}},在这个群中,任何与 H H 元素等价的双曲群 H ′ H' 都有一个基本嵌入。在附录中,我们完整地证明了塞拉提出的事实,即无扭双曲群 H H 上的塔是 H H 极限群。
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来源期刊
ACS Applied Bio Materials
ACS Applied Bio Materials Chemistry-Chemistry (all)
CiteScore
9.40
自引率
2.10%
发文量
464
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