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Communications in Algebra Volume 46, 2018 - Issue 9
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Original Articles

Commuting involution graphs for

Sarah HartDepartment of Economics, Mathematics and Statistics, Birkbeck College, London, United Kingdom of Great Britain and Northern IrelandCorrespondence[email protected]
ORCID Iconhttp://orcid.org/0000-0003-3612-0736
ORCID Icon &
Amal Sbeiti ClarkeDepartment of Economics, Mathematics and Statistics, Birkbeck College, London, United Kingdom of Great Britain and Northern Ireland
Pages 3965-3985 | Received 07 Dec 2016, Published online: 26 Feb 2018

References

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  • Bates, C., Bundy, D., Perkins, S., Rowley, P. (2003). Commuting involution graphs for finite Coxeter groups. J. Group Theory 6:461–476.
  • Bates, C., Bundy, D., Perkins, S., Rowley, P. (2003). Commuting involution graphs for symmetric groups. J. Algebra 266(1):133–153.
  • Fischer, B. (1971). Finite group generated by 3-transpositions I. Invent. Math. 13:232–246.
  • Giudici, M., Pope, A. (2014). On bounding the diameter of the commuting graph of a group. J. Group Theory 17(1):131–149.
  • Humphreys, J. E. (1990). Reflection groups and Coxeter groups. Cambridge Stud. Adv. Math. 29.
  • Nawawi, A., Rowley (2015). On commuting graphs for elements of order 3 in symmetric groups. Electron. J. Combin. 22(1): Paper 1.21, 12 pp.
  • Perkins, S. (2006). Commuting involution graphs in the affine Weyl group Ãn. Arch. Math. 86(1):16–25.
  • Richardson, R. W. (1982). Conjugacy Classes of involutions in Coxeter groups. Bull. Austral. Math. Soc. 26:1–15.
  • Segev, Y., Seitz, G. M. (2002). Anisotropic groups of type An and the commuting graph of finite simple groups. Pacific J. Math. 202:125–226.

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