GROUPS IN WHICH ALL SUBGROUPS OF INFINITE RANK ARE SUBNORMAL

LEONID A. KURDACHENKO; HOWARD SMITH

doi:10.1017/S0017089503001551

Abstract

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Let $G$ be a locally soluble-by-finite group in which every non-subnormal subgroup has finite rank. It is proved that either $G$ has finite rank or $G$ is soluble and locally nilpotent (and even a Baer group). On the other hand, a group $G$ is constructed that has infinite rank and satisfies the given hypothesis, but does not have every subgroup subnormal.

Crossref Citations

This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Kurdachenko, Leonid A. and Smith, Howard 2005. Groups with all subgroups either subnormal or self-normalizing. Journal of Pure and Applied Algebra, Vol. 196, Issue. 2-3, p. 271.

Kurdachenko, Leonid and Smith, Howard 2009. Groups with small deviation for non-subnormal subgroups. Open Mathematics, Vol. 7, Issue. 2,

Dixon, Martyn R. and Karatas, Yalcin 2012. Groups with all subgroups permutable or of finite rank. Central European Journal of Mathematics, Vol. 10, Issue. 3, p. 950.

de Giovanni, F. 2014. Infinite Groups with Rank Restrictions on Subgroups. Journal of Mathematical Sciences, Vol. 199, Issue. 3, p. 261.

De Falco, M. de Giovanni, F. and Musella, C. 2014. Large soluble groups and the control of embedding properties. Ricerche di Matematica, Vol. 63, Issue. S1, p. 117.

DE LUCA, ANNA VALENTINA and DI GRAZIA, GIOVANNA 2016. GROUPS OF INFINITE RANK WITH NORMALITY CONDITIONS ON SUBGROUPS WITH SMALL NORMAL CLOSURE. Bulletin of the Australian Mathematical Society, Vol. 94, Issue. 1, p. 48.

Ballester-Bolinches, A. Camp-Mora, S. Kurdachenko, L. A. and Spagnuolo, F. 2016. On groups whose subgroups of infinite rank are Sylow permutable. Annali di Matematica Pura ed Applicata (1923 -), Vol. 195, Issue. 3, p. 717.

De Luca, Anna Valentina and Ialenti, Roberto 2018. Groups in which every subgroup of infinite rank is almost permutable. Communications in Algebra, Vol. 46, Issue. 7, p. 2899.

Dixon, Martyn R. Ferrara, Maria and Trombetti, Marco 2018. Groups in which all subgroups of infinite special rank have bounded near defect. Communications in Algebra, Vol. 46, Issue. 12, p. 5416.

Dixon, M. R. Kurdachenko, L. A. Semko, N. N. and Subbotin, I. Ya. 2020. On some topics in the theory of infinite dimensional linear groups. Algebra and Discrete Mathematics, Vol. 29, Issue. 1, p. 1.

Camp-Mora, Sergio and Monetta, Carmine 2020. Groups with some families of complemented subgroups. Archiv der Mathematik, Vol. 115, Issue. 2, p. 131.

Dixon, Martyn R. Kurdachenko, Leonid A. and Subbotin, Igor Ya. 2022. On conormal subgroups. International Journal of Algebra and Computation, Vol. 32, Issue. 02, p. 327.

Article contents

GROUPS IN WHICH ALL SUBGROUPS OF INFINITE RANK ARE SUBNORMAL

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This article has been cited by the following publications. This list is generated based on data provided by Crossref.

Article contents

GROUPS IN WHICH ALL SUBGROUPS OF INFINITE RANK ARE SUBNORMAL

Abstract

Keywords

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