6533b873fe1ef96bd12d5f37
RESEARCH PRODUCT
Field of values of cut groups and k-rational groups
Alexander Moretósubject
Pure mathematicsFinite groupAlgebra and Number TheoryCharacter (mathematics)Character tableSolvable groupBounded functionOrder (group theory)Alternating groupField (mathematics)Mathematicsdescription
Abstract Motivated by a question of A. Bachle, we prove that if the field of values of any irreducible character of a finite group G is imaginary quadratic or rational, then the field generated by the character table Q ( G ) / Q is an extension of degree bounded in terms of the largest alternating group that appears as a composition factor of G. In order to prove this result, we extend a theorem of J. Tent on quadratic rational solvable groups to nonsolvable groups.
| year | journal | country | edition | language |
|---|---|---|---|---|
| 2022-02-01 | Journal of Algebra |