On minimal factorisations of sporadic groups.
Holmes, P.E. (2004)
Experimental Mathematics
Similarity:
Displaying similar documents to “On a property of the one-dimensional torus”
On minimal factorisations of sporadic groups.
Simple group contain minimal simple groups.
Michael J. J. Barry, Michael B. Ward (1997)
Publicacions Matemàtiques
Similarity:
It is a consequence of the classification of finite simple groups that every non-abelian simple group contains a subgroup which is a minimal simple group.
A survey of minimal sets
Walter H. Gottschalk (1964)
Annales de l'institut Fourier
Similarity:
Classification of finite groups with many minimal subgroups and with the number of conjugacy classes of G/S(G) equal to 8.
Antonio Vera López, Jesús María Arregi Lizarraga, Francisco José Vera López (1990)
Collectanea Mathematica
Similarity:
In this paper we classify all the finite groups satisfying r(G/S(G))=8 and ß(G)=r(G) - a(G) - 1, where r(G) is the number of conjugacy classes of G, ß(G) is the number of minimal normal subgroups of G, S(G) the socle of G and a(G) the number of conjugacy classes of G out of S(G). These results are a contribution to the general problem of the classification of the finite groups according to the number of conjugacy classes.
A note on a paper of Bernard Charles («Étude sur les sous-groupes d'un groupe abélien»)
Ch. Megibben (1963)
Bulletin de la Société Mathématique de France
Similarity:
Products of Minimal Abelian Groups.
D.N. Dikranjan, D.B. Shakhmatov (1990)
Mathematische Zeitschrift
Similarity:
Remarks on a problem in primary abelian groups
T.J. Head (1963)
Bulletin de la Société Mathématique de France
Similarity:
Bases of certain finite groups
Raffaele Scapellato, Libero Verardi (1994)
Annales mathématiques Blaise Pascal
Similarity: