Solvable groups with \(p\)-modular character degrees of prime power (Q1173871)
From MaRDI portal
 | This is the item page for this Wikibase entity, intended for internal use and editing purposes. Please use this page instead for the normal view: Solvable groups with \(p\)-modular character degrees of prime power |
scientific article; zbMATH DE number 7638
| Language | Label | Description | Also known as |
|---|---|---|---|
| English | Solvable groups with \(p\)-modular character degrees of prime power |
scientific article; zbMATH DE number 7638 |
Statements
Solvable groups with \(p\)-modular character degrees of prime power (English)
0 references
25 June 1992
0 references
O. Manz considered solvable groups whose ordinary character degrees are all prime powers. He showed that the nilpotent length is bounded by \(n(G) \leq 4\) and if two primes occur in the set of character degrees, the derived length is bounded by \(dl(G) \leq 5\). In this paper we consider solvable groups whose \(p\)-modular character degrees are prime powers. It turns out that we can bound the nilpotent length of \(G/O_ p(G)\) by \(n(G/O_ p(G)) \leq 4\) too. But it is impossible to bound the derived length.
0 references
character degrees
0 references
nilpotent length
0 references
derived length
0 references
solvable groups
0 references
\(p\)-modular character degrees
0 references
0.94384325
0 references
0.9398028
0 references
0.93483746
0 references
0.9255484
0 references
0.92399704
0 references
0.92389184
0 references
0.9223785
0 references
0.9216147
0 references
0.9202477
0 references
