[Avi] Avis, D., lrslib -- reverse search vertex enumeration program, {A}vailable at \url{http://cgm.cs.mcgill.ca/~avis/C/lrs.html}.
[BC15] B\"achle, A. and Caicedo, M.,
On the Prime Graph Question for Almost Simple Groups with an
Alternatin Socle,
Submitted,
\href{http://arxiv.org/abs/1510.04598}{\nolinkurl{arXiv:1510.04598
[math.RT]}}
(2015)
(11 pages).
[BM14] B\"achle, A. and Margolis, L.,
Rational conjugacy of torsion units in integral group rings of
non-solvable groups,
Accepted in Proc. Edinb. Math. Soc.,
\href{http://arxiv.org/abs/1305.7419}{\nolinkurl{arXiv:1305.7419
[math.RT]}}
(2014)
(22 pages).
[BM16] B\"achle, A. and Margolis, L.,
On the Prime Graph Question for Integral
Group Rings of 4-primary groups I,
Preprint,
\href{http://arxiv.org/abs/1601.05689}{\nolinkurl{arXiv:1601.05689
[math.RT]}}
(2016)
(33 pages).
[BH08] Bovdi, V. A. and Hertweck, M., Zassenhaus conjecture for central extensions of S_5, J. Group Theory, 11 (1) (2008), 63--74.
[BJK11] Bovdi, V. A., Jespers, E. and Konovalov, A. B., Torsion units in integral group rings of Janko simple groups, Math. Comp., 80 (273) (2011), 593--615.
[BK07a] Bovdi, V. A. and Konovalov, A. B., Integral group ring of the first Mathieu simple group, in Groups St. Andrews 2005. Vol. 1, Cambridge Univ. Press, Cambridge, London Math. Soc. Lecture Note Ser., 339 (2007), 237--245.
[BK07b] Bovdi, V. A. and Konovalov, A. B., Integral group ring of the McLaughlin simple group, Algebra Discrete Math. (2) (2007), 43--53.
[BK10] Bovdi, V. A. and Konovalov, A. B., Torsion units in integral group ring of Higman-Sims simple group, Studia Sci. Math. Hungar., 47 (1) (2010), 1--11.
[BKL08] Bovdi, V. A., Konovalov, A. B. and Linton, S., Torsion units in integral group ring of the Mathieu simple group M_22, LMS J. Comput. Math., 11 (2008), 28--39.
[BIRSS] Bruns, W., Ichim, B., R\"omer, T., Sieg, R. and S\"oger, C., Normaliz. Algorithms for rational cones and affine monoids, Available at \url{http://normaliz.uos.de}.
[BM15] B{\"a}chle, A. and Margolis, L.,
HeLP -- A \textsfGAP-package for torsion units
in integral group rings,
Submitted
(2015)
(7 pages,
\href{http://arxiv.org/abs/1507.08174}{\nolinkurl{arXiv:1507.08174
[math.RT]}}).
[CMR13] Caicedo, M., Margolis, L. and del R{\'{\i}}o, {., Zassenhaus conjecture for cyclic-by-abelian groups, J. Lond. Math. Soc. (2), 88 (1) (2013), 65--78.
[CL65] Cohn, J. A. and Livingstone, D., On the structure of group algebras. I, Canad. J. Math., 17 (1965), 583--593.
[CR90] Curtis, C. W. and Reiner, I.,
Methods of representation theory. Vol. I,
John Wiley \& Sons, Inc., New York,
Wiley Classics Library
(1990),
xxiv+819 pages
(With applications to finite groups and orders,
Reprint of the 1981 original,
A Wiley-Interscience Publication).
[Gil13] Gildea, J., Zassenhaus conjecture for integral group ring of simple linear groups, J. Algebra Appl., 12 (6) (2013), 1350016, 10.
[Her06] Hertweck, M., On the torsion units of some integral group rings, Algebra Colloq., 13 (2) (2006), 329--348.
[Her07] Hertweck, M.,
Partial Augmentations and Brauer Character values of torion
Units in Group Rings,
Preprint
(2007)
(e-print
\href{http://arxiv.org/abs/math/0612429v2}{\nolinkurl{arXiv:math.RA/0612429v2
[math.RA]}}).
[Her08a] Hertweck, M., The orders of torsion units in integral group rings of finite solvable groups, Comm. Algebra, 36 (10) (2008), 3585--3588.
[Her08b] Hertweck, M., Torsion units in integral group rings of certain metabelian groups, Proc. Edinb. Math. Soc. (2), 51 (2) (2008), 363--385.
[Her08c] Hertweck, M., Zassenhaus conjecture for A_6, Proc. Indian Acad. Sci. Math. Sci., 118 (2) (2008), 189--195.
[HK06] H{\"o}fert, C. and Kimmerle, W., On torsion units of integral group rings of groups of small order, in Groups, rings and group rings, Chapman \& Hall/CRC, Boca Raton, FL, Lect. Notes Pure Appl. Math., 248 (2006), 243--252.
[JM00] Juriaans, S. O. and Polcino Milies, C., Units of integral group rings of Frobenius groups, J. Group Theory, 3 (3) (2000), 277--284.
[Kim06] Kimmerle, W., On the prime graph of the unit group of integral group rings of finite groups, in Groups, rings and algebras, Amer. Math. Soc., Providence, RI, Contemp. Math., 420 (2006), 215--228.
[Kim07] Kimmerle, W., Mini-Workshop: Arithmetik von Gruppenringen, Oberwolfach Reports, European Mathematical Society, 4 (4) (2007), 3209-3239.
[KK15] Kimmerle, W. and Konovalov, A. B., Recent advances on torsion subgroups of Integral Group Rings, Proc. of Groups St Andrews 2013 (2015), 331--347.
[LP89] Luthar, I. S. and Passi, I. B. S., Zassenhaus conjecture for A_5, Proc. Indian Acad. Sci. Math. Sci., 99 (1) (1989), 1--5.
[MRSW87] Marciniak, Z., Ritter, J., Sehgal, S. and Weiss, A., Torsion units in integral group rings of some metabelian groups. II, Journal of Number Theory, 25 (3) (1987), 340--352.
[Sal11] Salim, M., Kimmerle's conjecture for integral group rings of some alternating groups, Acta Math. Acad. Paedagog. Nyh\'azi. (N.S.), 27 (1) (2011), 9--22.
[Sal13] Salim, M., The prime graph conjecture for integral group rings of some alternating groups, Int. J. Group Theory, 2 (1) (2013), 175--185.
[Seh93] Sehgal, S. K., Units in integral group rings, Longman Scientific \& Technical, Pitman Monographs and Surveys in Pure and Applied Mathematics, 69, Harlow (1993), xii+357 pages.
[SW86] Sehgal, S. K. and Weiss, A., Torsion units in integral group rings of some metabelian groups, J. Algebra, 103 (2) (1986), 490--499.
[Sri64] Srinivasan, B., On the modular characters of the special linear group SL(2,p^n), Proc. London Math. Soc. (3), 14 (1964), 101--114.
[tea] team, 4. t. 2., 4ti2---A software package for algebraic, geometric and combinatorial problems on linear spaces, {A}vailable at \url{www.4ti2.de}.
[Wag95] Wagner, R., Zassenhausvermutung über die Gruppen textupPSL(2, p) (1995), Diplomarbeit Universität Stuttgart.
[Wei91] Weiss, A., Torsion units in integral group rings, J. Reine Angew. Math., 415 (1991), 175--187.
[Zas74] Zassenhaus, H., On the torsion units of group rings, Estudos de Mathemátics em homenagem ao Prof. A. Almeida Costa, Instituto de Alta Cultura (Portugese) (1974), 119-126.
generated by GAPDoc2HTML