Groups with Representations of Bounded Degree
- 1 January 1964
- journal article
- Published by Canadian Mathematical Society in Canadian Journal of Mathematics
- Vol. 16, 299-309
- https://doi.org/10.4153/cjm-1964-029-5
Abstract
Let G be a discrete group with group algebra C[G] over the complex numbers C. In (5) Kaplansky essentially proves that if G has a normal abelian subgroup of finite index n, then all irreducible representations of C[G] have degree ≤n. Our main theorem is a converse of Kaplansky's result. In fact we show that if all irreducible representations of C[G] have degree ≤n, then G has an abelian subgroup of index not greater than some function of n. (The degree of a representation of C[G] for arbitrary G is defined precisely in § 3.)Keywords
This publication has 6 references indexed in Scilit:
- On groups with enough finite representationsProceedings of the American Mathematical Society, 1963
- Groups which have a faithful representation of degree less than (p− 1∕2)Pacific Journal of Mathematics, 1961
- Groups with representations of bounded degree IIIllinois Journal of Mathematics, 1961
- Die Theorie der Gruppen von Endlicher OrdnungPublished by Springer Nature ,1956
- The Uniqueness of Norm Problem in Banach AlgebrasAnnals of Mathematics, 1950
- Groups with Representations of Bounded DegreeCanadian Journal of Mathematics, 1949