Accession Number:
AD0691865
Title:
A GENERALIZATION OF FEIT'S THEOREM,
Descriptive Note:
Corporate Author:
RAND CORP SANTA MONICA CALIF
Personal Author(s):
Report Date:
1969-08-01
Pagination or Media Count:
22.0
Abstract:
This paper is part of a doctoral thesis titled-Finite Linear Groups in Six Variables. It is shown that I can prove that if p is a prime greater than five with p -1mod 4, and G is a finite group with faithful complex representation of degree smaller than both 4p3 and 3p - 12, then G has a normal p-subgroup of index in G divisible at most by p squared. These methods are particularly effective when there is nontrivial intersection of p-Sylow subgroups. Author
Descriptors:
Subject Categories:
- Theoretical Mathematics