Your download is now in progress and you may close this window

Did you know that with a free Taylor & Francis Online account you can gain access to the following benefits?

Choose new content alerts to be informed about new research of interest to you
Easy remote access to your institution's subscriptions on any device, from any location
Save your searches and schedule alerts to send you new results
Export your search results into a .csv file to support your research

Have an account?
Login now Don't have an account?
Register for free

Login or register to access this feature

Have an account?
Login now Don't have an account?
Register for free

Choose new content alerts to be informed about new research of interest to you
Easy remote access to your institution's subscriptions on any device, from any location
Save your searches and schedule alerts to send you new results
Export your search results into a .csv file to support your research

Search in:

Advanced search

Communications in Algebra Volume 51, 2023 - Issue 3

Submit an article Journal homepage

Open access

389

Views

CrossRef citations to date

Altmetric

Research Articles

Completions of the Goldschmidt G₃-amalgam and alternating groups

Peter J. RowleyDepartment of Mathematics, University of Manchester, Manchester, UK.Correspondence[email protected]

Daniel M. VaseyDepartment of Mathematics, University of Manchester, Manchester, UK.

Pages 1186-1200 | Received 03 Aug 2020, Accepted 27 Sep 2022, Published online: 20 Oct 2022

Cite this article
https://doi.org/10.1080/00927872.2022.2133130
CrossMark

Full Article
Figures & data
References
Citations
Metrics
Licensing
Reprints & Permissions
View PDF PDF View EPUB EPUB

References

Bundy, D. M., Rowley, P. J. (2006). Symmetric groups and completions of the Goldschmidt amalgams of type G1 . J. Group Theory 9(5):627–640.
Web of Science ®Google Scholar
Conder, M. (1988). An infinite family of 5-arc-transitive cubic graphs. Ars Combin. 25(A):95–108.
Google Scholar
Goldschmidt, D. M. (1980). Automorphisms of trivalent graphs. Ann. Math. (2) 111(2):377–406. DOI: 10.2307/1971203.
Web of Science ®Google Scholar
Lorimer, P. (1984). Vertex-transitive graphs: Symmetric graphs of prime valency. J. Graph Theory 8(1):55–68. DOI: 10.1002/jgt.3190080107.
Web of Science ®Google Scholar
Parker, C., Rowley, P. (2000). Classical groups in dimension 3 as completions of the Goldschmidt G3 -amalgam. J. London Math. Soc. (2) 62(3):802–812.
Google Scholar
Parker, C., Rowley, P. (2001). Sporadic simple groups which are completions of the Goldschmidt G3 -amalgam. J. Algebra 235(1):131–153.
Web of Science ®Google Scholar
Parker, C., Rowley, P. (2002). Finite completions of the Goldschmidt G3 -amalgam and the Mathieu groups. Commun. Algebra 30(12):5611–5619.
Web of Science ®Google Scholar
Vasey, D. M. (2014). Alternating groups as completions of the Goldschmidt G3 -amalgam. PhD thesis. University of Manchester.
Google Scholar
Wielandt, H. (1964). Finite Permutation Groups. London/New York: Academic Press.
Google Scholar

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.

People also read
Recommended articles
Cited by

To cite this article:

Reference style: APA Chicago Harvard

Citation copied to clipboard

Reference styles above use APA (6th edition), Chicago (16th edition) & Harvard (10th edition)

Download citation

Download a citation file in RIS format that can be imported by citation management software including EndNote, ProCite, RefWorks and Reference Manager.

Choose format: RIS BibTex RefWorks Direct Export

Choose options: Citation Citation & abstract Citation & references