Geodesic
On periodic groups saturated with finite Frobenius groups
The Bulletin of Irkutsk State University. Series Mathematics, Tome 35 (2021), pp. 73-86 Cet article a éte moissonné depuis la source Math-Net.Ru

Voir la notice de l'article

A group is called weakly conjugate biprimitively finite if each its element of prime order generates a finite subgroup with any of its conjugate elements. A binary finite group is a periodic group in which any two elements generate a finite subgroup. If $\mathfrak{X}$ is some set of finite groups, then the group $G$ saturated with groups from the set $\mathfrak{X}$ if any finite subgroup of $G$ is contained in a subgroup of $G$, isomorphic to some group from $\mathfrak{X}$. A group $G = F \leftthreetimes H$ is a Frobenius group with kernel $F$ and a complement $H$ if $H \cap H^f = 1$ for all $f \in F^{\#}$ and each element from $G \setminus F$ belongs to a one conjugated to $H$ subgroup of $G$. In the paper we prove that a saturated with finite Frobenius groups periodic weakly conjugate biprimitive finite group with a nontrivial locally finite radical is a Frobenius group. A number of properties of such groups and their quotient groups by a locally finite radical are found. A similar result was obtained for binary finite groups with the indicated conditions. Examples of periodic non locally finite groups with the properties above are given, and a number of questions on combinatorial group theory are raised.
Keywords: weakly conjugate biprimitive finite group, locally finite radical
Mots-clés : Frobenius group, saturation condition. 
@article{IIGUM_2021_35_a5,
     author = {B. E. Durakov and A. I. Sozutov},
     title = {On periodic groups saturated with finite {Frobenius} groups},
     journal = {The Bulletin of Irkutsk State University. Series Mathematics},
     pages = {73--86},
     year = {2021},
     volume = {35},
     language = {en},
     url = {http://geodesic.mathdoc.fr/item/IIGUM_2021_35_a5/}
}
TY  - JOUR
AU  - B. E. Durakov
AU  - A. I. Sozutov
TI  - On periodic groups saturated with finite Frobenius groups
JO  - The Bulletin of Irkutsk State University. Series Mathematics
PY  - 2021
SP  - 73
EP  - 86
VL  - 35
UR  - http://geodesic.mathdoc.fr/item/IIGUM_2021_35_a5/
LA  - en
ID  - IIGUM_2021_35_a5
ER  - 
%0 Journal Article
%A B. E. Durakov
%A A. I. Sozutov
%T On periodic groups saturated with finite Frobenius groups
%J The Bulletin of Irkutsk State University. Series Mathematics
%D 2021
%P 73-86
%V 35
%U http://geodesic.mathdoc.fr/item/IIGUM_2021_35_a5/
%G en
%F IIGUM_2021_35_a5
B. E. Durakov; A. I. Sozutov. On periodic groups saturated with finite Frobenius groups. The Bulletin of Irkutsk State University. Series Mathematics, Tome 35 (2021), pp. 73-86. http://geodesic.mathdoc.fr/item/IIGUM_2021_35_a5/

[1] Adyan S. I., “Periodic products of groups”, Proceedings of the Steklov Institute of Mathematics, 142, 1976, 3–21

[2] Adyan S. I., The Burnside problem and identities in groups, Nauka Publ, M., 1975 (in Russian)

[3] Belousov I. N., Kondratyev A. S., Rozhkov A. V., “XII School-Conference on Group Theory, dedicated to the 65th anniversary of A.A. Mahnev”, Trudy IMM UrO RAN, 24, no. 3, 2018, 286–295 (in Russian) | DOI

[4] Bludov V. V., “On Frobenius groups”, Sib. Math. J., 38:6 (1997), 1219–1221 | DOI

[5] Khukhro E. I., Mazurov V. D., Unsolved Problems in Group Theory. The Kourovka Notebook, 2020, arXiv: 1401.0300

[6] Kreknin V. A., Kostrikin A. I., “On Lie algebras with regular automorphism”, Doklady Akademii Nauk, 149 (1963), 249–251 (in Russian)

[7] Lytkina D. V., Mazurov V. D., “Periodic groups saturated with finite simple groups of Lie type $B_3$”, Sib. matem. zhurn., 61:3 (2020), 634–640 (in Russian) | DOI

[8] Lytkina D. V., Sozutov A. I., Shlepkin A. A., “Periodic groups of $2$-rank 2 saturated with finite simple groups”, Sib. electr. math. izv., 15 (2018), 786–796 (in Russian) | DOI

[9] Lytkina D. V., Shlepkin A. A., “Periodic Groups Saturated with the Linear Groups of Degree 2 and the Unitary Groups of Degree 3 over Finite Fields of Odd Characteristic”, Sib. Adv. Math., 28 (2018), 175–186 | DOI | DOI

[10] Olshanskiy A.Yu., Geometry of defining relations in groups, Springer Science Business Media, 70, 2012, 446 pp.

[11] Olshanskiy A.Yu., “An remark about countable non-topologizable group”, Vestnik MGU. Ser. 1, Math., Mech., 3 (1980), 103 (in Russian)

[12] Popov A. M., Sozutov A. I., Shunkov V. P., Groups with systems of Frobenius subgroups, IPC KGTU Publ, Krasnoyarsk, 2004, 211 pp. (in Russian)

[13] Sozutov A. I., “On groups saturated with finite Frobenius groups”, Math. Notes

[14] Sozutov A. I., “On groups with Frobenius pairs of conjugated elements”, Algebra i Logika, 16:2 (1977), 204–212 (in Russian)

[15] Sozutov A. I., “On the Shunkov groups acting freely on Abelian groups”, Sib. Math. J., 54 (2013), 144–151 | DOI

[16] Sozutov A. I., On existence of infinite subgroups with non-trivial locally finite radical in the group, Preprint, VC SO AN SSSR, Krasnoyarsk, 1980, 11–19 (in Russian)

[17] Sozutov A. I., “An example of infinite finitely generated Frobenius group”, VII Vsesoyuz. simpoz. po teorii grupp (Krasnoyarsk, 1980), 116 (in Russian)

[18] Sozutov A. I., Suchkov N. M., Suchkova N. G., Infinite groups with involutions, SFU Publ., Krasnoyarsk, 2011, 149 pp. (in Russian)

[19] Starostin A. I., “On Frobenius groups”, Ukr. Math. J., 23 (1971), 518–526 | DOI

[20] Shirvanyan V. L., “Non-commutative periodic groups with nontrivial intersections of all cyclic subgroups”, VII Vsesoyuz. simpoz. po teorii grupp (Krasnoyarsk, 1980), 137 (in Russian)

[21] Shlepkin A. A., “On groups saturated with dihedral groups and linear groups of degree 2”, Sib. elektron. matem. izv., 15 (2018), 74–85 (in Russian) | DOI

[22] Shlepkin A. A., “On Shunkov group saturated with finite simple groups”, The Bulletin of Irkutsk State University. Series Mathematics, 24 (2018), 51–67 (in Russian) | DOI

[23] Shlepkin A. A., “On periodic groups and Shunkov groups saturated with dihedral groups and $A_5$”, The Bulletin of Irkutsk State University. Series Mathematics, 20 (2017), 96–108 (in Russian) | DOI

[24] Shlepkin A. A., “On periodic part of a Shunkov group saturated with wreathed groups”, Trudy IMM UrO RAN, 24, no. 3, 2018, 281–285 (in Russian) | DOI

[25] Shlepkin A. A., “On Sylow 2-subgroups of Shunkov groups saturated with groups $L_3(2^m)$”, Trudy IMM UrO RAN, 25, no. 4, 2019, 275–282 (in Russian) | DOI

[26] Shlepkin A. A., “Periodic Groups Saturated with Finite Simple Groups of Lie Type of Rank 1”, Algebra and Logic, 57:1 (2018), 81–86 | DOI | DOI

[27] Shlepkin A. K., Rubashkin A. G., “A class of periodic groups”, Algebra and Logic, 44 (2005), 65–71 | DOI

[28] Amberg B., Kazarin L., “Periodic groups saturated with dihedral subgroups”, Book of abstracts of the international algebraic conference dedicated to 70-th birthday of Anatoly Yakovlev (Saint Petersburg, 2010), 79–80

[29] Amberg B., Fransman A., Kazarin L., “Products of locally dihedral subgroups”, Journal of Algebra, 350:1 (2012), 308–317 | DOI

[30] Higman G., “Groups and ring which have automorphisms without non-trivial fixed elements”, J. London Math. Soc., 32 (1957), 321–334 | DOI

[31] Shlepkin A. A., “Groups with a Strongly Embedded Subgroup Saturated with Finite Simple Non-abelian Groups”, The Bulletin of Irkutsk State University. Series Mathematics, 31 (2020), 132–141 | DOI

[32] Shlepkin A. A., “On the periodic part of the Shunkov group saturated with linear groups of degree 2 over finite fields of even characteristic”, Chebyshevskiy sb., 20:4 (2019), 399–407 | DOI