Abstract
AbstractTwo ways of describing a group are considered. 1. A group isfinite-automaton presentableif its elements can be represented by strings over a finite alphabet, in such a way that the set of representing strings and the group operation can be recognized by finite automata. 2. An infinite f.g. group isquasi-finitely axiomatizableif there is a description consisting of a single first-order sentence, together with the information that the group is finitely generated. In the first part of the paper we survey examples of FA-presentable groups, but also discuss theorems restricting this class. In the second part, we give examples of quasi-finitely axiomatizable groups, consider the algebraic content of the notion, and compare it to the notion of a group which is a prime model. We also show that if a structure is bi-interpretable in parameters with the ring of integers, then it is prime and quasi-finitely axiomatizable.
Publisher
Cambridge University Press (CUP)
Reference35 articles.
1. On a correspondence between rings and groups;Mal'cev;American Mathematical Society Translations,1965
2. Akiyama S. , Frougny F. , and Sakharovitch J. , Powers of rationals modulo 1 and rational base systems, preprint, 2005.
3. FINITELY GENERATED GROUPS AND FIRST-ORDER LOGIC
4. Théories décidables par automate fini;Hodgson;Annales des Sciences Mathématiques du Quebec,1983
Cited by
48 articles.
订阅此论文施引文献
订阅此论文施引文献,注册后可以免费订阅5篇论文的施引文献,订阅后可以查看论文全部施引文献