On the number of irreducible real-valued characters of a finite group

Nguyen Ngoc Hung,A.A Schaeffer Fry,Hung P Tong-Viet,C Ryan Vinroot

doi:10.1016/j.jalgebra.2020.03.008

On the number of irreducible real-valued characters of a finite group

Nguyen Ngoc Hung, A.A Schaeffer Fry + Show 2 more

Open Access

https://doi.org/10.1016/j.jalgebra.2020.03.008

Copy DOI

Journal: Journal of Algebra	Publication Date: Apr 1, 2020
Citations: 6	License type: publisher-specific-oa

Affiliation: University of Akron, Metropolitan State University of Denver, Binghamton University, William & Mary

#Real-valued Irreducible Characters #Irreducible Characters + Show 6 more

Abstract
Full-Text PDF
Similar Papers

Abstract

We prove that there exists an integer-valued function f on positive integers such that if a finite group G has at most k real-valued irreducible characters, then |G/Sol(G)|≤f(k), where Sol(G) denotes the largest solvable normal subgroup of G. In the case k=5, we further classify G/Sol(G). This partly answers a question of Iwasaki [15] on the relationship between the structure of a finite group and its number of real-valued irreducible characters.

Full Text