Article
Licensed
Unlicensed
Requires Authentication
Finite groups whose irreducible characters vanish on at most three conjugacy classes
-
Jinshan Zhang
Published/Copyright:
May 30, 2010
Abstract
The aim of this note is to classify the finite groups whose irreducible characters vanish on at most three conjugacy classes in the character table.
Received: 2009-02-13
Revised: 2009-12-09
Published Online: 2010-05-30
Published in Print: 2010-November
© de Gruyter 2010
You are currently not able to access this content.
You are currently not able to access this content.
Articles in the same Issue
- The power graph of a finite group, II
- On p-Brauer characters of p′-degree and self-normalizing Sylow p-subgroups
- Finite groups whose irreducible characters vanish on at most three conjugacy classes
- The conjugacy of triality subgroups of Sylow subloops of Moufang loops
- On two questions of L. A. Shemetkov concerning hypercyclically embedded subgroups of finite groups
- Periodic patterns in the graph of p-groups of maximal class
- Lower bounds for representation growth
- Reflexive group topologies on Abelian groups
- On abstract commensurators of groups
- On the SQ-universality of groups with special presentations
Articles in the same Issue
- The power graph of a finite group, II
- On p-Brauer characters of p′-degree and self-normalizing Sylow p-subgroups
- Finite groups whose irreducible characters vanish on at most three conjugacy classes
- The conjugacy of triality subgroups of Sylow subloops of Moufang loops
- On two questions of L. A. Shemetkov concerning hypercyclically embedded subgroups of finite groups
- Periodic patterns in the graph of p-groups of maximal class
- Lower bounds for representation growth
- Reflexive group topologies on Abelian groups
- On abstract commensurators of groups
- On the SQ-universality of groups with special presentations
