Pro-Hall R-groups and groups discriminated by the free pro-p group

Montserrat Casals-Ruiz; Ilya Kazachkov; Vladimir Remeslennikov

doi:10.1515/jgth-2016-0505

Artikel

Pro-Hall R-groups and groups discriminated by the free pro-p group

Montserrat Casals-Ruiz , Ilya Kazachkov und Vladimir Remeslennikov

Veröffentlicht/Copyright: 9. April 2016

Veröffentlicht von

Veröffentlichen auch Sie bei De Gruyter Brill

Manuskript einreichen Informationen für Autor*innen Erkunden Sie dieses Fachgebiet

Aus der Zeitschrift Journal of Group Theory Band 19 Heft 3

Abstract

In this note we introduce pro-Hall R-groups as inverse limits of Hall R-groups and show that for the binomial closure S^bin of any ring S discriminated by ℤ_p, the free pro-Hall S^bin-group 𝔽(A,S^bin) is fully residually free pro-p. Furthermore, we prove that any finite set of elements in 𝔽(A,S^bin) defines a pro-p subgroup and so an irreducible coordinate group over the free pro-p group.

Funding source: ERC

Award Identifier / Grant number: PCG-336983

Funding source: Russian Foundation for Basic Research

Award Identifier / Grant number: N14-01-00068

Funding statement: The first author is supported by the Juan de la Cierva Programme of the Spanish Government. The second author is supported by the ERC grant PCG-336983. The first two authors are partly supported by the the Spanish Government, grant MTM2014-53810-C2-2-P, and by the Basque Government, grant IT974-16. The third author is supported by the grant of the Russian Fund for Basic Research N14-01-00068.

References

1 S. G. Afanaseva, Algebraic geometry over rigid solvable pro-p groups PhD thesis, Sobolev Mathematical Institute, 2014. Suche in Google Scholar

2 N. Bourbaki, Commutative Algebra, Springer, Berlin, 1989. Suche in Google Scholar

3 E. Daniyarova, A. Myasnikov and V. Remeslennikov, Unification theorems in algebraic geometry, Aspects of Infinite Groups, Algebra Discrete Math. 1, World Scientific, Hackensack (2008), 80–111. 10.1142/9789812793416_0007Suche in Google Scholar

4 E. Daniyarova, A. Myasnikov and V. Remeslennikov, Algebraic geometry over algebraic systems. II: Foundations (in Russian), Fundam. Prikl. Mat. 17 (2011/12), 1, 65–106. 10.1134/S1064562411050073Suche in Google Scholar

5 J. Elliott, Binomial rings, integer-valued polynomials, and λ-rings, J. Pure Applied Algebra 207 (2006), 1, 165–185. 10.1016/j.jpaa.2005.09.003Suche in Google Scholar

6 P. Hall, Nilpotent Groups, Queen Mary College Math. Notes, Queen Mary College (University of London), London, 1969. Suche in Google Scholar

7 O. Kharlampovich and A. Myasnikov, Irreducible affine varieties over free group II: Systems in triangular quasi-quadratic form and description of residually free groups, J. Algebra 200 (1998), 2, 517–570. 10.1006/jabr.1997.7184Suche in Google Scholar

8 D. H. Kochloukova and P. A. Zalesskii, On pro-p analogues of limit groups via extensions of centralizers, Math. Z. 267 (2011), 109–128. 10.1007/s00209-009-0611-ySuche in Google Scholar

9 R. C. Lyndon, Groups with parametric exponents, Trans. Amer. Math. Soc. 96 (1960), 518–533. 10.1090/S0002-9947-1960-0151502-6Suche in Google Scholar

10 A. Malcev, Algebraic Structures (in Russian), Nauka, Moscow, 1976. Suche in Google Scholar

11 S. G. Melesheva, Equations and algebraic geometry over profinite groups, Algebra Logic 49 (2010), 5, 444–455. 10.1007/s10469-010-9108-3Suche in Google Scholar

12 R. B. Warfield, Nilpotent Groups, Lecture notes in Math. 513, Springer, Berlin, 1976. 10.1007/BFb0080152Suche in Google Scholar

13 J. S. Wilson, Profinite Groups, Clarendon Press, Oxford, 1998. 10.1093/oso/9780198500827.001.0001Suche in Google Scholar

Received: 2015-5-26

Published Online: 2016-4-9

Published in Print: 2016-5-1

Sie haben derzeit keinen Zugang zu diesem Inhalt.

Artikel in diesem Heft

https://doi.org/10.1515/jgth-2016-0505