References
- An, L., Brennan, J. P., Qu, H., Wilcox, E. (2015). Chermak-Delgado lattice extension theorems. Comm. Algebra 43(5):2201–2213. DOI:10.1080/00927872.2014.889147.
- Brewster, B., Wilcox, E. (2012). Some groups with computable Chermak-Delgado lattices. Bull. Aust. Math. Soc. 86(1):29–40. DOI:10.1017/S0004972712000196.
- Brewster, B., Hauck, P., Wilcox, E. (2014). Groups whose Chermak-Delgado lattice is a chain. J. Group Theor. 17:253–279.
- Brewster, B., Hauck, P., Wilcox, E. (2014). Quasi-antichain Chermak-Delgado lattices of finite groups. Arch. Math. 103(4):301–311. DOI:10.1007/s00013-014-0696-3.
- Chermak, A., Delgado, A. (1989). A measuring argument for finite groups. Proc. Amer. Math. Soc. 107(4):907–914. DOI:10.2307/2047648.
- Glauberman, G. (2006). Centrally large subgroups of finite p-groups. J. Algebra 300(2):480–508. DOI:10.1016/j.jalgebra.2005.11.033.
- Isaacs, I. M. (2008). Finite Group Theory. Providence, RI: American Mathematical Society.
- McCulloch, R. (2017). Chermak-Delgado simple groups. Comm. Algebra 45(3):983–991. DOI:10.1080/00927872.2016.1172623.
- McCulloch, R. (2018). Finite groups with a trivial Chermak-Delgado subgroup. J. Group Theor. 21(3):449–461. DOI:10.1515/jgth-2017-0042.
- McCulloch, R., Tărnăuceanu, M. (2018). Two classes of finite groups whose Chermak-Delgado lattice is a chain of length zero. Comm. Algebra 46(7):3092–3096. DOI:10.1080/00927872.2017.1404090.
- Schmidt, R. (1994). Subgroup Lattices of Groups, de Gruyter Expositions in Mathematics 14. Berlin: de Gruyter.
- Suzuki, M. (1982). Group Theory, I, II. Berlin: Springer Verlag.
- Tărnăuceanu, M. (2017). The Chermak-Delgado lattice of ZM-groups. Results Math. 72(4):1849–1855. DOI:10.1007/s00025-017-0735-z.
- Vieira, L. S. (2017). On p-adic fields and p-groups, Ph.D. Thesis, University of Kentucky.
- Wilcox, E. (2016). Exploring the Chermak-Delgado lattice. Math. Magazine 89(1):38–44. DOI:10.4169/math.mag.89.1.38.
- Xu, M., An, L., Zhang, Q. (2008). Finite p-groups all of whose non-abelian proper subgroups are generated by two elements. J. Algebra 319(9):3603–3620. DOI:10.1016/j.jalgebra.2008.01.045.
- Xue, H., Lv, H., Chen, G. (2014). On a special class of finite p-groups of maximal class. Italian J. Pure Appl. Math. 33:279–284.
- Morresi Zuccari, A., Russo, V., Scoppola, C. M. (2018). The Chermak-Delgado measure in finite p-groups. J. Algebra 502:262–276. DOI:10.1016/j.jalgebra.2018.01.030.