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Note on A-Groups

Published online by Cambridge University Press:  22 January 2016

Noboru Itô*
Affiliation:
Mathematical Institute, Nagoya University
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Let us consider soluble groups whose Sylow subgroups are all abelian. Such groups we call A-groups, following P. Hall. A-groups were investigated thoroughly by P. Hall and D. R. Taunt from the view point of the structure theory. In this note, we want to give some remarks concerning representation theoretical properties of A-groups.

Type
Research Article
Copyright
Copyright © Editorial Board of Nagoya Mathematical Journal 1952

References

1) Hall, P., The construction of soluble groups. J. Reine Angew. Math. 182, 206214 (1940)Google Scholar.

D. R. Taunt, On A-groups. Proc. Cambridge Philos. Soc. 45, 24-42 (1949).

The latter is not yet accessible to me.

2) Blichfeld, H., Finite Collineation Groups. Chicago (1917)Google Scholar.

3) Tazawa, M., Über die monomial darstellbaren endlichen Substitutionsgruppen. Proc. Acad. Jap. 10, 397-398 (1934)CrossRefGoogle Scholar.

4) Taketa, K., Über die Gruppen, deren Darstellungen sich sämtlich auf monomiale Gestalt transformieren lassen. Proc. Acad. Jap. 6, 31-33 (1930)CrossRefGoogle Scholar.

5) Itô, N., On the characters of soluble groups. These Journal 3, 31-48 (1951)Google Scholar.

6) Brauer, R. and Nesbitt, C., On the modular characters of groups. Ann. Math. 42, 556-590 (1941)CrossRefGoogle Scholar.

7) Brauer, R., On the arithmetic in a group ring. Proc. Nat. Acad. Sci. U.S.A. 109-114 (1944)Google Scholar. N. Itô, Some studies on group characters. These Journal 2, 17-28 (1951). (A remark to my paper: It was evident that f/eKfK = 1 by a theorem of L Schur, from which the description can be rather shortened.)

8) N. Itô, On the degrees of irreducible representations of a finite group. These Journal 3, 5-6 (1951).