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Something for nothing: some consequences of the solution of the Tarski problems

Published online by Cambridge University Press:  05 September 2015

Benjamin Fine
Affiliation:
Fairfield University
Anthony Gaglione
Affiliation:
Department of Mathematics
Gerhard Rosenberger
Affiliation:
University of Hamburg
Dennis Spellman
Affiliation:
Temple University
C. M. Campbell
Affiliation:
University of St Andrews, Scotland
M. R. Quick
Affiliation:
University of St Andrews, Scotland
E. F. Robertson
Affiliation:
University of St Andrews, Scotland
C. M. Roney-Dougal
Affiliation:
University of St Andrews, Scotland
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Summary

Introduction

Alfred Tarski in 1940 made three well-known conjectures concerning nonabelian free groups (see Section 2). There had been various partial solutions until complete positive solutions were presented during the past 15 years by Kharlampovich and Myasnikov (see [51]–[59]) and independently by Z. Sela (see [78]–[83]). In the Kharlampovich- Myasnikov approach the proof arose from a detailed study of fully residually free groups (called limit groups in Sela's approach), the development of algebraic geometry over free groups, and an elimination process involving solutions of equations over free groups based on work of Makhanin and Razborov (see [51]–[59]). These steps were mirrored, with somewhat different terminology, by Sela, who called his approach diophantine geometry over free groups.

The positive solution of the Tarski conjectures provides a straightforward proof of Magnus's theorem in surface groups which we present. This result was proved directly by J. Howie [46] and independently by O. Bogopolski [10]. We will present this proof in Section 4. This type of proof leads to several different types of questions.

  1. • Which additional nontrivial free group results are true in surface groups but difficult to obtain directly?

  2. • What first-order properties of nonabelian free groups are true beyond the class of elementary free groups?

After showing a proof of Magnus's Theorem based on the solution of the Tarski problems we give several examples of other free group results holding in surface groups. Using this technique we give a proof of a theorem of D. Lee on C-test words. We then consider and prove certain other results that hold in elementary free groups, in particular surface groups, including the retract theorem of Turner [86] and the property of conjugacy separability.

After this we turn to the second type of question and survey a large number of recent results. In particular we first consider groups satisfying certain quadratic properties that we call Lyndon properties and show that the class of groups satisfying these properties are closed under many amalgam constructions.

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Publisher: Cambridge University Press
Print publication year: 2015

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