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Communications in Algebra Volume 52, 2024 - Issue 7
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Research Article

L9-free groups

Imke ToborgMathematics, Martin-Luther-Universitat Halle-Wittenberg, Halle, Germany
,
Rebecca WaldeckerMathematics, Martin-Luther-Universitat Halle-Wittenberg, Halle, GermanyCorrespondence[email protected]
ORCID Iconhttps://orcid.org/0000-0001-8502-4295
ORCID Icon &
Clemens B. TietzeMathematics, Martin-Luther-Universitat Halle-Wittenberg, Halle, Germany
Pages 2815-2851 | Received 18 Jul 2023, Accepted 15 Jan 2024, Published online: 05 Feb 2024

References

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  • Iwasawa, K. (1941). Ueber endliche Gruppen und die Verbaende ihrer Untergruppen. J. Fac. Sci. Imp. Univ. Tokyo I(4):171–199.
  • Kurzweil, H., Stellmacher, B. (1998). Theorie der endlichen Gruppen. Berlin: Springer.
  • Pölzing, J., Waldecker, R. (2015). M9-free groups. J. Group Theory 18:155–190. DOI: 10.1515/jgth-2014-0034.
  • Schmidt, R. (1994). Subgroup Lattices of Groups. Berlin: de Gruyter.
  • Schmidt, R. (2003). L-free groups. Illinois J. Math. 47(1/2):515–528. DOI: 10.1215/ijm/1258488169.
  • Schmidt, R. (2007). L10-free groups. J. Group Theory 10:613–631.
  • Schmidt, R. (2010). L10-Free {p, q}-groups. Note Mat. 30:55–72.

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