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A subgroup $M$ of a group $G$ is nearly maximal if the index $| G : M |$ is infinite but every subgroup of $G$ properly containing $M$ has finite index, and the group $G$ is called nearly $I M$ if all its subgroups of infinite index are intersections of nearly maximal subgroups. It is proved that an infinite (generalized) soluble group is nearly $I M$ if and only if it is either cyclic or dihedral.

On minimal non-PC-groups

Francesco Russo, Nadir Trabelsi (2009)

Annales mathématiques Blaise Pascal

A group $G$ is said to be a PC-group, if $G / C_{G} (x^{G})$ is a polycyclic-by-finite group for all $x \in G$ . A minimal non-PC-group is a group which is not a PC-group but all of whose proper subgroups are PC-groups. Our main result is that a minimal non-PC-group having a non-trivial finite factor group is a finite cyclic extension of a divisible abelian group of finite rank.

On non-periodic groups whose finitely generated subgroups are either permutable or pronormal

L. A. Kurdachenko, I. Ya. Subbotin, T. I. Ermolkevich (2013)

Mathematica Bohemica

The current article considers some infinite groups whose finitely generated subgroups are either permutable or pronormal. A group $G$ is called a generalized radical, if $G$ has an ascending series whose factors are locally nilpotent or locally finite. The class of locally generalized radical groups is quite wide. For instance, it includes all locally finite, locally soluble, and almost locally soluble groups. The main result of this paper is the followingTheorem. Let $G$ be a locally generalized radical...

On some groups with almost regular element of prime order.

Popov, A.M. (2006)

Sibirskie Ehlektronnye Matematicheskie Izvestiya [electronic only]

On subsemigroup lattices of aperiodic groups.

S.V. Ivanov (1994)

Semigroup forum

On the exponent of the product of two groups

Avinoam Mann (2006)

Rendiconti del Seminario Matematico della Università di Padova

On the group of reduced identities of relatively free solvable groups.

Timoshenko, E.I. (2002)

Sibirskij Matematicheskij Zhurnal

On the Structure of the Normal Subgroups of a Group: Nilpotency.

J.C. BEIDLEMAN, D.J.S. ROBINSON (1991)

Forum mathematicum

Pronormality, contranormality and generalized nilpotency in infinite groups.

Leonid A. Kurdachenko, Igor Ya. Subbotin (2003)

Publicacions Matemàtiques

This article is dedicated to some criteria of generalized nilpotency involving pronormality and abnormality. Also new results on groups, in which abnormality is a transitive relation, have been obtained.

Residually finite groups with nontrivial intersections of pairs of subgroups.

Sozutov, A.I. (2000)

Siberian Mathematical Journal

Rigidity of graph products of groups.

Radcliffe, David G. (2003)

Algebraic & Geometric Topology

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