References
- [Bächle 16] A. Bächle, A. Herman, A. Konovalov, L. Margolis, and G. Singh. “ZCTU Source Code.” Available online (https://github.com/drallenherman/ZCTU-Source-Code), 2016.
- [Bächle and Margolis 16] A. Bächle and L. Margolis. HeLP – A GAP-package for torsion units in integral group rings (2016), arXiv:1507.08174v3 [math.RT].
- [Bächle and Margolis, to appear] A. Bächle and L. Margolis. “Rational Conjugacy of Torsion Units in Integral Group Ring of Non-solvable Groups.” Proc. Edinburgh Math. Soc. to appear. https://doi.org/10.1017/S0013091516000535.
- [Bovdi and Hertweck 08] V. Bovdi and M. Hertweck. “Zassenhaus Conjecture for Central Extensions of Sn.” J. Group Theory 11: 1 (2008), 63–74.
- [Bruns et al. 16] normaliz W. Bruns, B. Ichim, and C. Söger. “The Power of Pyramid Decomposition in Normaliz.” J. Symbolic Comput. 74 (2016), 513–536.
- [Caicedo et al. 13] M. Caicedo, L. Margolis, and Á. del Río. “Zassenhaus Conjecture for Cyclic-by-abelian Groups.” J. London Math. Soc., (2)88: 1 (2013), 65–78.
- [Dokuchaev and Juriaans 96] M. Dokuchaev and S. Juriaans. “Finite Subgroups in Integral Group Rings.” Can. J. Math. 48: 6 (1996), 1170–1179.
- [Herman and Singh 15] A. Herman and G. Singh. “Revisiting the Zassenhaus Conjecture on Torsion Units for the Integral Group Rings of Small Groups.” Proc. Math. Sci. Indian Acad. Sci. 125: 2 (2015), 167–172.
- [Hertweck 06] M. Hertweck. “On the Torsion Units of Some Integral Group Rings.” Algebra Colloq. 13: 2 (2006), 329–348.
- [Hertweck 07] M. Hertweck. Partial augmentations and Brauer character values of torsion units in group rings, (2007) arXiv:math/0612429v2 [math.RA].
- [Hertweck 08] M. Hertweck. “The Orders of Torsion Units in Integral Group Rings of Finite Solvable Groups.” Comm. Algebra 36: 10 (2008), 3585–3588.
- [Höfert and Kimmerle 06] C. Höfert and W. Kimmerle. On torsion units of integral group rings of groups of small order. Groups, rings and group rings, 243-252, Lect. Notes Pure Appl. Math., 248, Chapman & Hall/CRC, Boca Raton, FL, 2006.
- [Isaacs 76] I. M. Isaacs. Character Theory of Finite Groups. Pure and Applied Mathematics, No. 69. New York-London: Academic Press, 1976.
- [Luthar and Passi 89] I. S. Luthar and I. B. S. Passi. “Zassenhaus Conjecture for A5.” Proc. Indian Acad. Sci. Math. Sci. 99: 1 (1989), 1–5.
- [Marciniak et al. 87] Z. Marciniak, J. Ritter, S. Sehgal, and A. Weiss. “Torsion Units in Integral Group Rings of Some Metabelian Groups, II.” J. Number Theory 25 (1987), 340–352.
- [4ti2 team 15] 4ti2 team. 4ti2 – A software package for algebraic, geometric and combinatorialproblems on linear spaces. Available online (www.4ti2.de), 2015.
- [Sehgal 93] S. K. Sehgal. Units in Integral Group Rings, Pitman Monographs and Surveys in Pure and Applied Mathematics, No. 69, Longman Scientific and Technical, Harlow, copublished in the United States by John Wiley and Sons, New York, 1993.
- [The GAP Group 16] The GAP Group,. GAP – Groups, Algorithms, and Programming, Version 4.8.6. Available online (http://www.gap-system.org), 2016.
- [Weiss 91] A. Weiss. “Torsion Units in Integral Group Rings.” J. Reine Angew. Math. 415 (1991), 175–187.
- [Zassenhaus 74] H. Zassenhaus. “On the Torsion Units of Finite Group Rings.” In Estudos de matemática. Em homenagemal Prof. A. Almeida Costa, pp. 119–126. Instituto de Alta Cultura, Lisbon, 1974.